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prompt stringlengths 155 4.45k	response stringlengths 29 6.77k	question stringlengths 16 4.31k	answer stringlengths 29 6.77k
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Quadrilateral $ABCD$ is a parallelogram. What is the degree measure of angle $A$? [asy] size(100); draw((0,0)--(5,2)--(6,7)--(1,5)--cycle); draw((5,2)--(7.5,3)); draw(Arc((5,2),1,20,80)); label("$D$",(0,0),SW); label("$C$",(5,2),SE); label("$B$",(6,7),NE); label("$A$",(1,5),NW); label("$60^\circ$",(6.3,2.8), N); [/asy] ### Response:	All angle measures will be in degrees. $\angle DCB = 180 - 60 = 120$, and since opposite angles in a parallelogram are equal, we have $\angle A = \angle DCB = 120$. Hence the degree measure of $\angle A$ is $\boxed{120}$.	Quadrilateral $ABCD$ is a parallelogram. What is the degree measure of angle $A$? [asy] size(100); draw((0,0)--(5,2)--(6,7)--(1,5)--cycle); draw((5,2)--(7.5,3)); draw(Arc((5,2),1,20,80)); label("$D$",(0,0),SW); label("$C$",(5,2),SE); label("$B$",(6,7),NE); label("$A$",(1,5),NW); label("$60^\circ$",(6.3,2.8), N); [/asy]	All angle measures will be in degrees. $\angle DCB = 180 - 60 = 120$, and since opposite angles in a parallelogram are equal, we have $\angle A = \angle DCB = 120$. Hence the degree measure of $\angle A$ is $\boxed{120}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: What is the smallest possible number of whole 2-by-3 non-overlapping rectangles needed to cover a square region exactly, without extra over-hangs and without gaps? ### Response:	The area of each rectangle is $6$, so the area of the square must be divisible by $6$. The smallest square side length that satisfies this is $6$. It is easy to see that we can tile a $6$ by $6$ square with $2$ by $3$ rectangles - split the rows into pairs of two, then cover each pair with two rectangles laid end-to-end. Since the area of the square is $6^2=36$, and each rectangle has area $6$, the number of rectangles required is $\boxed{6}$.	What is the smallest possible number of whole 2-by-3 non-overlapping rectangles needed to cover a square region exactly, without extra over-hangs and without gaps?	The area of each rectangle is $6$, so the area of the square must be divisible by $6$. The smallest square side length that satisfies this is $6$. It is easy to see that we can tile a $6$ by $6$ square with $2$ by $3$ rectangles - split the rows into pairs of two, then cover each pair with two rectangles laid end-to-end. Since the area of the square is $6^2=36$, and each rectangle has area $6$, the number of rectangles required is $\boxed{6}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: How many perfect squares are there between 20 and 150? ### Response:	The perfect squares between 20 and 150 are the ones from $5^2$ through $12^2$. Excluding the first 4 positive squares from the first 12 positive squares leaves $12-4 = \boxed{8}$ perfect squares.	How many perfect squares are there between 20 and 150?	The perfect squares between 20 and 150 are the ones from $5^2$ through $12^2$. Excluding the first 4 positive squares from the first 12 positive squares leaves $12-4 = \boxed{8}$ perfect squares.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Many television screens are rectangles that are measured by the length of their diagonals. The ratio of the horizontal length to the height in a standard television screen is $4:3$. What is the horizontal length (in inches) of a ``27-inch'' television screen? [asy] fill((0,0)--(8,0)--(8,6)--cycle,gray(0.7)); draw((0,0)--(8,0)--(8,6)--(0,6)--cycle,linewidth(0.7)); draw((0,0)--(8,6),linewidth(0.7)); label("length",(4,0),S); label("height",(8,3),E); label("diagonal",(4,3),NW); [/asy] ### Response:	The height, length, and diagonal are in the ratio $3:4:5$. The length of the diagonal is 27, so the horizontal length is $\frac{4}{5} (27) = \boxed{21.6}$ inches.	Many television screens are rectangles that are measured by the length of their diagonals. The ratio of the horizontal length to the height in a standard television screen is $4:3$. What is the horizontal length (in inches) of a ``27-inch'' television screen? [asy] fill((0,0)--(8,0)--(8,6)--cycle,gray(0.7)); draw((0,0)--(8,0)--(8,6)--(0,6)--cycle,linewidth(0.7)); draw((0,0)--(8,6),linewidth(0.7)); label("length",(4,0),S); label("height",(8,3),E); label("diagonal",(4,3),NW); [/asy]	The height, length, and diagonal are in the ratio $3:4:5$. The length of the diagonal is 27, so the horizontal length is $\frac{4}{5} (27) = \boxed{21.6}$ inches.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: How many degrees are in each interior angle of a regular hexagon? ### Response:	The sum of the angle measures in a hexagon is $180(6-2) = 720$ degrees. The angles of a regular hexagon are congruent, so each measures $720^\circ/6 = \boxed{120^\circ}$.	How many degrees are in each interior angle of a regular hexagon?	The sum of the angle measures in a hexagon is $180(6-2) = 720$ degrees. The angles of a regular hexagon are congruent, so each measures $720^\circ/6 = \boxed{120^\circ}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Sandy's daughter has a playhouse in the back yard. She plans to cover the one shaded exterior wall and the two rectangular faces of the roof, also shaded, with a special siding to resist the elements. The siding is sold only in 8-foot by 12-foot sections that cost $\$27.30$ each. If Sandy can cut the siding when she gets home, how many dollars will be the cost of the siding Sandy must purchase? [asy] import three; size(101); currentprojection=orthographic(1/3,-1,1/2); real w = 1.5; real theta = pi/4; string dottedline = "2 4"; draw(surface((0,0,0)--(8,0,0)--(8,0,6)--(0,0,6)--cycle),gray(.7)+opacity(.5)); draw(surface((0,0,6)--(0,5cos(theta),6+5sin(theta))--(8,5cos(theta),6+5sin(theta))--(8,0,6)--cycle),gray(.7)+opacity(.5)); draw(surface((0,5cos(theta),6+5sin(theta))--(8,5cos(theta),6+5sin(theta))--(8,10cos(theta),6)--(0,10cos(theta),6)--cycle),gray (.7)+opacity(.5)); draw((0,0,0)--(8,0,0)--(8,0,6)--(0,0,6)--cycle,black+linewidth(w)); draw((0,0,6)--(0,5cos(theta),6+5sin(theta))--(8,5cos(theta),6+5sin(theta))--(8,0,6)--cycle,black+linewidth(w)); draw((8,0,0)--(8,10cos(theta),0)--(8,10cos(theta),6)--(8,5cos(theta),6+5sin(theta)),linewidth(w)); draw((0,0,0)--(0,10cos(theta),0)--(0,10cos(theta),6)--(0,0,6),linetype(dottedline)); draw((0,5cos(theta),6+5sin(theta))--(0,10cos(theta),6)--(8,10cos(theta),6)--(8,0,6),linetype(dottedline)); draw((0,10cos(theta),0)--(8,10cos(theta),0),linetype(dottedline)); label("8' ",(4,5cos(theta),6+5sin(theta)),N); label("5' ",(0,5cos(theta)/2,6+5sin(theta)/2),NW); label("6' ",(0,0,3),W); label("8' ",(4,0,0),S); [/asy] ### Response:	Sandy will need to cover an $8$ by $6$ rectangle and two $8$ by $5$ rectangles. Thus, she will need to have at her disposal a sheet that is $8$ by $16$, so she should buy two $8$ by $12$ feet sections. The total price will be $2 \cdot \$ 27.30 = \boxed{ \$ 54.60}$.	Sandy's daughter has a playhouse in the back yard. She plans to cover the one shaded exterior wall and the two rectangular faces of the roof, also shaded, with a special siding to resist the elements. The siding is sold only in 8-foot by 12-foot sections that cost $\$27.30$ each. If Sandy can cut the siding when she gets home, how many dollars will be the cost of the siding Sandy must purchase? [asy] import three; size(101); currentprojection=orthographic(1/3,-1,1/2); real w = 1.5; real theta = pi/4; string dottedline = "2 4"; draw(surface((0,0,0)--(8,0,0)--(8,0,6)--(0,0,6)--cycle),gray(.7)+opacity(.5)); draw(surface((0,0,6)--(0,5cos(theta),6+5sin(theta))--(8,5cos(theta),6+5sin(theta))--(8,0,6)--cycle),gray(.7)+opacity(.5)); draw(surface((0,5cos(theta),6+5sin(theta))--(8,5cos(theta),6+5sin(theta))--(8,10cos(theta),6)--(0,10cos(theta),6)--cycle),gray (.7)+opacity(.5)); draw((0,0,0)--(8,0,0)--(8,0,6)--(0,0,6)--cycle,black+linewidth(w)); draw((0,0,6)--(0,5cos(theta),6+5sin(theta))--(8,5cos(theta),6+5sin(theta))--(8,0,6)--cycle,black+linewidth(w)); draw((8,0,0)--(8,10cos(theta),0)--(8,10cos(theta),6)--(8,5cos(theta),6+5sin(theta)),linewidth(w)); draw((0,0,0)--(0,10cos(theta),0)--(0,10cos(theta),6)--(0,0,6),linetype(dottedline)); draw((0,5cos(theta),6+5sin(theta))--(0,10cos(theta),6)--(8,10cos(theta),6)--(8,0,6),linetype(dottedline)); draw((0,10cos(theta),0)--(8,10cos(theta),0),linetype(dottedline)); label("8' ",(4,5cos(theta),6+5sin(theta)),N); label("5' ",(0,5cos(theta)/2,6+5sin(theta)/2),NW); label("6' ",(0,0,3),W); label("8' ",(4,0,0),S); [/asy]	Sandy will need to cover an $8$ by $6$ rectangle and two $8$ by $5$ rectangles. Thus, she will need to have at her disposal a sheet that is $8$ by $16$, so she should buy two $8$ by $12$ feet sections. The total price will be $2 \cdot \$ 27.30 = \boxed{ \$ 54.60}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: How many perfect cubes are between 100 and 900? ### Response:	The smallest perfect cube inside this range is $5^3 = 125$ since $4^3 = 64.$ As for the highest cube, we know that $10^3 = 1000,$ which is outside the range, so we try $9^3 = 729.$ Therefore the cubes in question are $5^3,6^3,7^3,8^3,9^3$. So there are $\boxed{5}$ such cubes.	How many perfect cubes are between 100 and 900?	The smallest perfect cube inside this range is $5^3 = 125$ since $4^3 = 64.$ As for the highest cube, we know that $10^3 = 1000,$ which is outside the range, so we try $9^3 = 729.$ Therefore the cubes in question are $5^3,6^3,7^3,8^3,9^3$. So there are $\boxed{5}$ such cubes.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: How many positive integers smaller than $1{,}000{,}000$ are powers of $2$, but are not powers of $8$? You may find it useful to consider that $2^{10}=1024$. ### Response:	The hint is useful because it tells us that $2^{20}$ is equal to $1024^2$, which is slightly more than $1{,}000{,}000$, but is clearly less than $2{,}000{,}000$. Therefore, the largest power of $2$ which is less than $1{,}000{,}000$ is $2^{19}$. This tells us that $20$ of the integers smaller than $1{,}000{,}000$ are powers of $2$: $$2^0, 2^1, 2^2, 2^3, \ldots, 2^{17}, 2^{18}, 2^{19}.$$ However, we have to exclude the $7$ numbers $$2^0, 2^3, 2^6, 2^9, 2^{12}, 2^{15}, 2^{18}$$ from our count, because these are all powers of $8$ (in general, $2^{3n}$ is the same as $(2^3)^n$, which is $8^n$). That leaves us with $20-7 = \boxed{13}$ powers of $2$ that aren't powers of $8$.	How many positive integers smaller than $1{,}000{,}000$ are powers of $2$, but are not powers of $8$? You may find it useful to consider that $2^{10}=1024$.	The hint is useful because it tells us that $2^{20}$ is equal to $1024^2$, which is slightly more than $1{,}000{,}000$, but is clearly less than $2{,}000{,}000$. Therefore, the largest power of $2$ which is less than $1{,}000{,}000$ is $2^{19}$. This tells us that $20$ of the integers smaller than $1{,}000{,}000$ are powers of $2$: $$2^0, 2^1, 2^2, 2^3, \ldots, 2^{17}, 2^{18}, 2^{19}.$$ However, we have to exclude the $7$ numbers $$2^0, 2^3, 2^6, 2^9, 2^{12}, 2^{15}, 2^{18}$$ from our count, because these are all powers of $8$ (in general, $2^{3n}$ is the same as $(2^3)^n$, which is $8^n$). That leaves us with $20-7 = \boxed{13}$ powers of $2$ that aren't powers of $8$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Each triangle is a 30-60-90 triangle, and the hypotenuse of one triangle is the longer leg of an adjacent triangle. The hypotenuse of the largest triangle is 8 centimeters. What is the number of centimeters in the length of the longer leg of the smallest triangle? Express your answer as a common fraction. [asy] pair O; for(int i = 0; i < 5; ++i){ draw(O--((2/sqrt(3))^i)dir(30i)); } for(int g = 0; g < 4; ++g){ draw( ((2/sqrt(3))^g)dir(30g)-- ((2/sqrt(3))^(g+1))dir(30g+30)); } label("8 cm", O--(16/9)dir(120), W); label("$30^{\circ}$",.4dir(0),dir(90)); label("$30^{\circ}$",.4dir(25),dir(115)); label("$30^{\circ}$",.4dir(50),dir(140)); label("$30^{\circ}$",.4dir(85),dir(175)); real t = (2/(sqrt(3))); draw(rightanglemark((1,.1),(1,0),(.9,0),s=3)); draw(rightanglemark(rotate(30)(0,t*4),rotate(0)(0,t*3),O,s=3)); draw(rightanglemark(rotate(0)(0,t*3),rotate(-30)(0,t*2),O,s=3)); draw(rightanglemark(rotate(-30)(0,t*2),rotate(-60)(0,t**1),O,s=3)); [/asy] ### Response:	First, we label the diagram as shown below: [asy] size(190); pair O; for(int i = 0; i < 5; ++i){ draw(O--((2/sqrt(3))^i)dir(30i)); } for(int g = 0; g < 4; ++g){ draw( ((2/sqrt(3))^g)dir(30g)-- ((2/sqrt(3))^(g+1))dir(30g+30)); } label("8 cm", O--(16/9)dir(120), W); label("$30^{\circ}$",.4dir(0),dir(90)); label("$30^{\circ}$",.4dir(25),dir(115)); label("$30^{\circ}$",.4dir(50),dir(140)); label("$30^{\circ}$",.4dir(85),dir(175)); real t = (2/(sqrt(3))); label("$B$",(0,t3),N); label("$A$",rotate(30)(0,t*4),NW); label("$C$",rotate(-30)(0,tt),NE); label("$D$",rotate(-60)(0,t),NE); label("$E$",(1,0),E); label("$O$",O,S); draw(rightanglemark((1,.1),(1,0),(.9,0),s=3)); draw(rightanglemark(rotate(30)(0,t4),rotate(0)(0,t*3),O,s=3)); draw(rightanglemark(rotate(0)(0,t*3),rotate(-30)(0,t*2),O,s=3)); draw(rightanglemark(rotate(-30)(0,t*2),rotate(-60)(0,t**1),O,s=3)); [/asy] All four right triangles are 30-60-90 triangles. Therefore, the length of the shorter leg in each triangle is half the hypotenuse, and the length of the longer leg is $\sqrt{3}$ times the length of the shorter leg. We apply these facts to each triangle, starting with $\triangle AOB$ and working clockwise. From $\triangle AOB$, we find $AB = AO/2 = 4$ and $BO = AB\sqrt{3}=4\sqrt{3}$. From $\triangle BOC$, we find $BC = BO/2 =2\sqrt{3}$ and $CO = BC\sqrt{3} =2\sqrt{3}\cdot\sqrt{3} = 6$. From $\triangle COD$, we find $CD = CO/2 = 3$ and $DO = CD\sqrt{3} = 3\sqrt{3}$. From $\triangle DOE$, we find $DE = DO/2 = 3\sqrt{3}/2$ and $EO =DE\sqrt{3} = (3\sqrt{3}/2)\cdot \sqrt{3} = (3\sqrt{3}\cdot \sqrt{3})/2 = \boxed{\frac{9}{2}}$.	Each triangle is a 30-60-90 triangle, and the hypotenuse of one triangle is the longer leg of an adjacent triangle. The hypotenuse of the largest triangle is 8 centimeters. What is the number of centimeters in the length of the longer leg of the smallest triangle? Express your answer as a common fraction. [asy] pair O; for(int i = 0; i < 5; ++i){ draw(O--((2/sqrt(3))^i)dir(30i)); } for(int g = 0; g < 4; ++g){ draw( ((2/sqrt(3))^g)dir(30g)-- ((2/sqrt(3))^(g+1))dir(30g+30)); } label("8 cm", O--(16/9)dir(120), W); label("$30^{\circ}$",.4dir(0),dir(90)); label("$30^{\circ}$",.4dir(25),dir(115)); label("$30^{\circ}$",.4dir(50),dir(140)); label("$30^{\circ}$",.4dir(85),dir(175)); real t = (2/(sqrt(3))); draw(rightanglemark((1,.1),(1,0),(.9,0),s=3)); draw(rightanglemark(rotate(30)(0,t*4),rotate(0)(0,t*3),O,s=3)); draw(rightanglemark(rotate(0)(0,t*3),rotate(-30)(0,t*2),O,s=3)); draw(rightanglemark(rotate(-30)(0,t*2),rotate(-60)(0,t**1),O,s=3)); [/asy]	First, we label the diagram as shown below: [asy] size(190); pair O; for(int i = 0; i < 5; ++i){ draw(O--((2/sqrt(3))^i)dir(30i)); } for(int g = 0; g < 4; ++g){ draw( ((2/sqrt(3))^g)dir(30g)-- ((2/sqrt(3))^(g+1))dir(30g+30)); } label("8 cm", O--(16/9)dir(120), W); label("$30^{\circ}$",.4dir(0),dir(90)); label("$30^{\circ}$",.4dir(25),dir(115)); label("$30^{\circ}$",.4dir(50),dir(140)); label("$30^{\circ}$",.4dir(85),dir(175)); real t = (2/(sqrt(3))); label("$B$",(0,t3),N); label("$A$",rotate(30)(0,t*4),NW); label("$C$",rotate(-30)(0,tt),NE); label("$D$",rotate(-60)(0,t),NE); label("$E$",(1,0),E); label("$O$",O,S); draw(rightanglemark((1,.1),(1,0),(.9,0),s=3)); draw(rightanglemark(rotate(30)(0,t4),rotate(0)(0,t*3),O,s=3)); draw(rightanglemark(rotate(0)(0,t*3),rotate(-30)(0,t*2),O,s=3)); draw(rightanglemark(rotate(-30)(0,t*2),rotate(-60)(0,t**1),O,s=3)); [/asy] All four right triangles are 30-60-90 triangles. Therefore, the length of the shorter leg in each triangle is half the hypotenuse, and the length of the longer leg is $\sqrt{3}$ times the length of the shorter leg. We apply these facts to each triangle, starting with $\triangle AOB$ and working clockwise. From $\triangle AOB$, we find $AB = AO/2 = 4$ and $BO = AB\sqrt{3}=4\sqrt{3}$. From $\triangle BOC$, we find $BC = BO/2 =2\sqrt{3}$ and $CO = BC\sqrt{3} =2\sqrt{3}\cdot\sqrt{3} = 6$. From $\triangle COD$, we find $CD = CO/2 = 3$ and $DO = CD\sqrt{3} = 3\sqrt{3}$. From $\triangle DOE$, we find $DE = DO/2 = 3\sqrt{3}/2$ and $EO =DE\sqrt{3} = (3\sqrt{3}/2)\cdot \sqrt{3} = (3\sqrt{3}\cdot \sqrt{3})/2 = \boxed{\frac{9}{2}}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: My friend reads three times as fast as I do. If it takes me 2 hours to read a novella, how many minutes will it take my friend to read the same novella? ### Response:	In reading, $\text{speed}=\frac{\text{amount of material}}{\text{time}}.$ Let the amount of material in the novella be $N.$ So $\text{speed}=\frac{N}{\text{time}}.$ Also, it is a good idea to convert hours to minutes since the answer should be in minutes: $2hrs=2\cdot 60min= 120min.$ Knowing that my friend reads three times as fast as I do, we can set up a proportion of our speeds: $$\frac{\text{my friend's speed}}{\text{my speed}}=3.$$And now we can use the formula above to proceed. \begin{align} \frac{\text{my friend's speed}}{\text{my speed}}&=3\\ \frac{\frac{N}{\text{my friend's time}}}{\frac{N}{120\text{ min}}}&=3\\ \frac{N}{\text{my friend's time}}\cdot\frac{120\text{ min}}{N}&=3\\ \frac{N\cdot 120\text{ min}}{\text{my friend's time}\cdot N}&=3\\ \frac{120\text{ min}}{\text{my friend's time}}&=3\\ \text{my friend's time}&=\frac{120\text{ min}}{3}\\ \text{my friend's time}&=\boxed{40\text{ min}}. \end{align}	My friend reads three times as fast as I do. If it takes me 2 hours to read a novella, how many minutes will it take my friend to read the same novella?	In reading, $\text{speed}=\frac{\text{amount of material}}{\text{time}}.$ Let the amount of material in the novella be $N.$ So $\text{speed}=\frac{N}{\text{time}}.$ Also, it is a good idea to convert hours to minutes since the answer should be in minutes: $2hrs=2\cdot 60min= 120min.$ Knowing that my friend reads three times as fast as I do, we can set up a proportion of our speeds: $$\frac{\text{my friend's speed}}{\text{my speed}}=3.$$And now we can use the formula above to proceed. \begin{align} \frac{\text{my friend's speed}}{\text{my speed}}&=3\\ \frac{\frac{N}{\text{my friend's time}}}{\frac{N}{120\text{ min}}}&=3\\ \frac{N}{\text{my friend's time}}\cdot\frac{120\text{ min}}{N}&=3\\ \frac{N\cdot 120\text{ min}}{\text{my friend's time}\cdot N}&=3\\ \frac{120\text{ min}}{\text{my friend's time}}&=3\\ \text{my friend's time}&=\frac{120\text{ min}}{3}\\ \text{my friend's time}&=\boxed{40\text{ min}}. \end{align}
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: It costs 5 cents to copy 3 pages. How many pages can you copy for $\$20$? ### Response:	We are given the conversion factor $\frac{3\text{ pages}}{5\text{ cents}} = 1$. We want to find how many pages we can copy for $\$20$, which is equal to $2000$ cents. Thus, we can copy \[2000\text{ cents}\cdot \frac{3\text{ pages}}{5\text{ cents}} = \boxed{1200}\text{ pages}.\]	It costs 5 cents to copy 3 pages. How many pages can you copy for $\$20$?	We are given the conversion factor $\frac{3\text{ pages}}{5\text{ cents}} = 1$. We want to find how many pages we can copy for $\$20$, which is equal to $2000$ cents. Thus, we can copy \[2000\text{ cents}\cdot \frac{3\text{ pages}}{5\text{ cents}} = \boxed{1200}\text{ pages}.\]
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Write the expression $\frac{4+3c}{7}+2$ as a single fraction. ### Response:	In order to combine the fraction and the integer into a single fraction, we write $2$ as a fraction with a denominator of $7$, or $\frac{14}{7}$. We get \[\frac{4+3c}{7}+\frac{14}{7}=\frac{4+3c+14}{7}=\boxed{\frac{18+3c}{7}}.\]	Write the expression $\frac{4+3c}{7}+2$ as a single fraction.	In order to combine the fraction and the integer into a single fraction, we write $2$ as a fraction with a denominator of $7$, or $\frac{14}{7}$. We get \[\frac{4+3c}{7}+\frac{14}{7}=\frac{4+3c+14}{7}=\boxed{\frac{18+3c}{7}}.\]
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: If 20$\%$ of 10$\%$ of a number is 12, what is 10$\%$ of 20$\%$ of the same number? ### Response:	$20\%$ of a number is the same as multiplying by .2, and $10\%$ of a number is the same as multiplying by .1. Since a percent of a percent is simply multiplying two decimals, it does not matter what order we take the percentages - it will be the same result. Thus, the answer is $\boxed{12}$.	If 20$\%$ of 10$\%$ of a number is 12, what is 10$\%$ of 20$\%$ of the same number?	$20\%$ of a number is the same as multiplying by .2, and $10\%$ of a number is the same as multiplying by .1. Since a percent of a percent is simply multiplying two decimals, it does not matter what order we take the percentages - it will be the same result. Thus, the answer is $\boxed{12}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Find $2.5-0.32.$ ### Response:	We can organize this subtraction quickly using columns as follows: \[ \begin{array}{@{}c@{}c@{}c@{}c@{}c} & 2 & . & 5 & 0 \\ - & 0 & . & 3 &2 \\ \cline{1-5} & 2 & . & 1 & 8 \\ \end{array} \]Therefore, $2.5-0.32 = \boxed{2.18}.$	Find $2.5-0.32.$	We can organize this subtraction quickly using columns as follows: \[ \begin{array}{@{}c@{}c@{}c@{}c@{}c} & 2 & . & 5 & 0 \\ - & 0 & . & 3 &2 \\ \cline{1-5} & 2 & . & 1 & 8 \\ \end{array} \]Therefore, $2.5-0.32 = \boxed{2.18}.$
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: The 5 a.m. temperatures for seven consecutive days were $-7^{\circ}$, $-4^{\circ}$, $-4^{\circ}$, $-5^{\circ}$, $1^{\circ}$, $3^{\circ}$ and $2^{\circ}$ Celsius. What is the mean 5 a.m. temperature for the week in degrees Celsius? ### Response:	To add these up quickly, a trick is to simply cancel out one of the $-4$ and the 1 and 3, because those will sum to 0, and then add up 2 and $-5$ to make $-3$. Pairing that with $-7$ to make $-10$, and then $-14$. Dividing by 7, we get an average of $\boxed{-2}$.	The 5 a.m. temperatures for seven consecutive days were $-7^{\circ}$, $-4^{\circ}$, $-4^{\circ}$, $-5^{\circ}$, $1^{\circ}$, $3^{\circ}$ and $2^{\circ}$ Celsius. What is the mean 5 a.m. temperature for the week in degrees Celsius?	To add these up quickly, a trick is to simply cancel out one of the $-4$ and the 1 and 3, because those will sum to 0, and then add up 2 and $-5$ to make $-3$. Pairing that with $-7$ to make $-10$, and then $-14$. Dividing by 7, we get an average of $\boxed{-2}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Express $0.4\overline5$ as a common fraction. ### Response:	To express the number $0.4\overline{5}$ as a fraction, we call it $x$ and subtract it from $10x$: $$\begin{array}{r r c r@{}l} &10x &=& 4&.55555\ldots \\ - &x &=& 0&.45555\ldots \\ \hline &9x &=& 4&.1 \end{array}$$ This shows that $0.4\overline{5} = \frac{4.1}{9} = \boxed{\frac{41}{90}}$.	Express $0.4\overline5$ as a common fraction.	To express the number $0.4\overline{5}$ as a fraction, we call it $x$ and subtract it from $10x$: $$\begin{array}{r r c r@{}l} &10x &=& 4&.55555\ldots \\ - &x &=& 0&.45555\ldots \\ \hline &9x &=& 4&.1 \end{array}$$ This shows that $0.4\overline{5} = \frac{4.1}{9} = \boxed{\frac{41}{90}}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: A number in the set $\{50, 51, 52, 53, ... , 999\}$ is randomly selected. What is the probability that it is a two-digit number? Express your answer as a common fraction. ### Response:	To count the number of numbers in this set, we subtract 49 from all of the numbers, giving the set $\{1, 2, 3, \ldots , 950 \}$, making it obvious that there are 950 numbers total. Furthermore, the set $\{ 50, 51, 52, \ldots, 98, 99 \}$ corresponds to the more easily counted $\{ 1, 2, 3, \ldots , 49, 50 \}$ by subtracting 49. So, the probability of selecting a two-digit number is $\frac{50}{950} = \boxed{\frac{1}{19}}$.	A number in the set $\{50, 51, 52, 53, ... , 999\}$ is randomly selected. What is the probability that it is a two-digit number? Express your answer as a common fraction.	To count the number of numbers in this set, we subtract 49 from all of the numbers, giving the set $\{1, 2, 3, \ldots , 950 \}$, making it obvious that there are 950 numbers total. Furthermore, the set $\{ 50, 51, 52, \ldots, 98, 99 \}$ corresponds to the more easily counted $\{ 1, 2, 3, \ldots , 49, 50 \}$ by subtracting 49. So, the probability of selecting a two-digit number is $\frac{50}{950} = \boxed{\frac{1}{19}}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Ten families have an average of 2 children per family. If exactly two of these families are childless, what is the average number of children in the families with children? Express your answer as a decimal to the nearest tenth. ### Response:	There are $10(2)=20$ children total. If $2$ families are childless, $8$ have children. So the average number of children for a family with children is $$\frac{20}{8}=\boxed{2.5}$$	Ten families have an average of 2 children per family. If exactly two of these families are childless, what is the average number of children in the families with children? Express your answer as a decimal to the nearest tenth.	There are $10(2)=20$ children total. If $2$ families are childless, $8$ have children. So the average number of children for a family with children is $$\frac{20}{8}=\boxed{2.5}$$
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: While standing in line to buy concert tickets, Kit moved 60 feet closer to the ticket window over a period of 30 minutes. At this rate, how many minutes will it take her to move the remaining 70 yards to the ticket window? ### Response:	She moved 60 feet in 30 minutes, meaning her rate is $\frac{60}{30} = 2$ feet per minute. She has $70\cdot 3 = 210$ feet remaining, meaning she will need $\frac{210}{2} = \boxed{105}$ more minutes.	While standing in line to buy concert tickets, Kit moved 60 feet closer to the ticket window over a period of 30 minutes. At this rate, how many minutes will it take her to move the remaining 70 yards to the ticket window?	She moved 60 feet in 30 minutes, meaning her rate is $\frac{60}{30} = 2$ feet per minute. She has $70\cdot 3 = 210$ feet remaining, meaning she will need $\frac{210}{2} = \boxed{105}$ more minutes.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Four fair coins are to be flipped. What is the probability that all four will be heads or all four will be tails? Express your answer as a common fraction. ### Response:	Each coin has 2 possible outcomes, so the total number of possible outcomes is $2 \cdot 2 \cdot 2 \cdot 2=2^4=16$. Two of these are all tails and all heads, so the probability is $\frac{2}{16}=\boxed{\frac{1}{8}}$.	Four fair coins are to be flipped. What is the probability that all four will be heads or all four will be tails? Express your answer as a common fraction.	Each coin has 2 possible outcomes, so the total number of possible outcomes is $2 \cdot 2 \cdot 2 \cdot 2=2^4=16$. Two of these are all tails and all heads, so the probability is $\frac{2}{16}=\boxed{\frac{1}{8}}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: For how many three-digit positive integers is the sum of the digits equal to $5?$ ### Response:	Let the three digit integer be $abc.$ We must have $a+b+c=5,$ and $a\geq 1.$ Let $d=a-1.$ Then $d,$ $b,$ and $c$ are all nonnegative integers with $d+b+c=4.$ We can view this as placing two dividers among four dots, which can be done in a total of $\binom{6}{2}=\boxed{15}$ ways.	For how many three-digit positive integers is the sum of the digits equal to $5?$	Let the three digit integer be $abc.$ We must have $a+b+c=5,$ and $a\geq 1.$ Let $d=a-1.$ Then $d,$ $b,$ and $c$ are all nonnegative integers with $d+b+c=4.$ We can view this as placing two dividers among four dots, which can be done in a total of $\binom{6}{2}=\boxed{15}$ ways.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Find the smallest positive integer divisible by $10$, $11$, and $12$. ### Response:	Factoring all three numbers, we find that $10=2\cdot 5$, $11=11$, and $12=2^2\cdot 3$. Taking the highest power of each, we see that the least common multiple of the three numbers is $2^2\cdot 3\cdot 5\cdot 11=60\cdot 11=\boxed{660}$.	Find the smallest positive integer divisible by $10$, $11$, and $12$.	Factoring all three numbers, we find that $10=2\cdot 5$, $11=11$, and $12=2^2\cdot 3$. Taking the highest power of each, we see that the least common multiple of the three numbers is $2^2\cdot 3\cdot 5\cdot 11=60\cdot 11=\boxed{660}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Square A has side lengths each measuring $x$ inches. Square B has side lengths each measuring $4x$ inches. What is the ratio of the area of the smaller square to the area of the larger square? Express your answer as a common fraction. ### Response:	The area of the smaller square is $x\cdot x=x^2$ square inches. The area of the larger square is $4x\cdot4x=16x^2$ square inches. The ratio of the areas is $x^2/(16x^2)=\boxed{\frac{1}{16}}$.	Square A has side lengths each measuring $x$ inches. Square B has side lengths each measuring $4x$ inches. What is the ratio of the area of the smaller square to the area of the larger square? Express your answer as a common fraction.	The area of the smaller square is $x\cdot x=x^2$ square inches. The area of the larger square is $4x\cdot4x=16x^2$ square inches. The ratio of the areas is $x^2/(16x^2)=\boxed{\frac{1}{16}}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Jenny places a total of 18 red Easter eggs in several green baskets and a total of 24 orange Easter eggs in some blue baskets. Each basket contains the same number of eggs and there are at least 4 eggs in each basket. How many eggs did Jenny put in each basket? ### Response:	The number of eggs in each basket is a common divisor of 18 and 24 that is at least 4. The common divisors of 18 and 24 are 1, 2, 3, and 6, so there are $\boxed{6}$ eggs in each basket.	Jenny places a total of 18 red Easter eggs in several green baskets and a total of 24 orange Easter eggs in some blue baskets. Each basket contains the same number of eggs and there are at least 4 eggs in each basket. How many eggs did Jenny put in each basket?	The number of eggs in each basket is a common divisor of 18 and 24 that is at least 4. The common divisors of 18 and 24 are 1, 2, 3, and 6, so there are $\boxed{6}$ eggs in each basket.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Tracy had a bag of candies, and none of the candies could be broken into pieces. She ate $\frac{1}{3}$ of them and then gave $\frac{1}{4}$ of what remained to her friend Rachel. Tracy and her mom then each ate 15 candies from what Tracy had left. Finally, Tracy's brother took somewhere from one to five candies, leaving Tracy with three candies. How many candies did Tracy have at the start? ### Response:	Let $x$ be Tracy's starting number of candies. After eating $\frac{1}{3}$ of them, she had $\frac{2}{3}x$ left. Since $\frac{2}{3}x$ is an integer, $x$ is divisible by 3. After giving $\frac{1}{4}$ of this to Rachel, she had $\frac{3}{4}$ of $\frac{2}{3}x$ left, for a total of $\frac{3}{4} \cdot \frac{2}{3}x = \frac{1}{2}x$. Since $\frac{1}{2}x$ is an integer, $x$ is divisible by 2. Since $x$ is divisible by both 2 and 3, it is divisible by 6. After Tracy and her mom each ate 15 candies (they ate a total of 30), Tracy had $\frac{1}{2}x - 30$ candies left. After her brother took 1 to 5 candies, Tracy was left with 3. This means Tracy had 4 to 8 candies before her brother took some candies. Hence, $$ 4 \le \frac{1}{2}x - 30 \le 8\qquad \Rightarrow \qquad 34 \le \frac{1}{2}x \le 38\qquad \Rightarrow \qquad 68 \le x \le 76. $$Since $x$ is divisible by 6, and the only multiple of 6 in the above range is 72, we have $x = \boxed{72}$.	Tracy had a bag of candies, and none of the candies could be broken into pieces. She ate $\frac{1}{3}$ of them and then gave $\frac{1}{4}$ of what remained to her friend Rachel. Tracy and her mom then each ate 15 candies from what Tracy had left. Finally, Tracy's brother took somewhere from one to five candies, leaving Tracy with three candies. How many candies did Tracy have at the start?	Let $x$ be Tracy's starting number of candies. After eating $\frac{1}{3}$ of them, she had $\frac{2}{3}x$ left. Since $\frac{2}{3}x$ is an integer, $x$ is divisible by 3. After giving $\frac{1}{4}$ of this to Rachel, she had $\frac{3}{4}$ of $\frac{2}{3}x$ left, for a total of $\frac{3}{4} \cdot \frac{2}{3}x = \frac{1}{2}x$. Since $\frac{1}{2}x$ is an integer, $x$ is divisible by 2. Since $x$ is divisible by both 2 and 3, it is divisible by 6. After Tracy and her mom each ate 15 candies (they ate a total of 30), Tracy had $\frac{1}{2}x - 30$ candies left. After her brother took 1 to 5 candies, Tracy was left with 3. This means Tracy had 4 to 8 candies before her brother took some candies. Hence, $$ 4 \le \frac{1}{2}x - 30 \le 8\qquad \Rightarrow \qquad 34 \le \frac{1}{2}x \le 38\qquad \Rightarrow \qquad 68 \le x \le 76. $$Since $x$ is divisible by 6, and the only multiple of 6 in the above range is 72, we have $x = \boxed{72}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Evaluate: $-\left(14\div 2\cdot 9-60+3\cdot 9\right)$. ### Response:	Recall that the order of operations says that we must perform the multiplication and division before we do the addition and subtraction. Also, the operations inside the parentheses must be done before we negate the entire expression. Therefore, we have \begin{align}-\left(14\div 2\cdot 9-60+3\cdot 9\right)&=-\left(7\cdot 9-60+3\cdot 9\right) \\ &=-\left(63-60+3\cdot 9\right) \\ &=-\left(63-60+27\right) \\ &=-\left(63+(-60)+27\right) \\ &=-\left(63+27+(-60)\right) \\ &=-\left(90+(-60)\right) \\ &=-\left(90-60\right) \\ &=-\left(30\right) \\ &=\boxed{-30}.\end{align}	Evaluate: $-\left(14\div 2\cdot 9-60+3\cdot 9\right)$.	Recall that the order of operations says that we must perform the multiplication and division before we do the addition and subtraction. Also, the operations inside the parentheses must be done before we negate the entire expression. Therefore, we have \begin{align}-\left(14\div 2\cdot 9-60+3\cdot 9\right)&=-\left(7\cdot 9-60+3\cdot 9\right) \\ &=-\left(63-60+3\cdot 9\right) \\ &=-\left(63-60+27\right) \\ &=-\left(63+(-60)+27\right) \\ &=-\left(63+27+(-60)\right) \\ &=-\left(90+(-60)\right) \\ &=-\left(90-60\right) \\ &=-\left(30\right) \\ &=\boxed{-30}.\end{align}
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: 12 balls numbered 1 through 12 are placed in a bin. In how many ways can 3 balls be drawn, in order, from the bin, if each ball remains outside the bin after it is drawn? ### Response:	There are 12 choices for the first ball, 11 remaining choices for the second ball, and 10 remaining choices for the third ball, for a total of $12 \times 11 \times 10 = \boxed{1320}$ possible drawings.	12 balls numbered 1 through 12 are placed in a bin. In how many ways can 3 balls be drawn, in order, from the bin, if each ball remains outside the bin after it is drawn?	There are 12 choices for the first ball, 11 remaining choices for the second ball, and 10 remaining choices for the third ball, for a total of $12 \times 11 \times 10 = \boxed{1320}$ possible drawings.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Chandra has four bowls. Each one is a different color (red, blue, yellow, green). She also has exactly one glass the same color as each bowl. If she chooses a bowl and a glass from the cupboard, how many pairings are possible? One such pairing is a blue bowl and a yellow glass. ### Response:	There are four different bowls and four different glasses that Chandra can pick. Since her choices are mutually exclusive, there are $4 \times 4 = \boxed{16}$ possible pairings.	Chandra has four bowls. Each one is a different color (red, blue, yellow, green). She also has exactly one glass the same color as each bowl. If she chooses a bowl and a glass from the cupboard, how many pairings are possible? One such pairing is a blue bowl and a yellow glass.	There are four different bowls and four different glasses that Chandra can pick. Since her choices are mutually exclusive, there are $4 \times 4 = \boxed{16}$ possible pairings.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: What is $(2^3)^3$? ### Response:	Two cubed is $2^3 = 2 \cdot 2 \cdot 2 = 8$. Eight cubed is $8^3 = 8 \cdot 8 \cdot 8 = \boxed{512}.$	What is $(2^3)^3$?	Two cubed is $2^3 = 2 \cdot 2 \cdot 2 = 8$. Eight cubed is $8^3 = 8 \cdot 8 \cdot 8 = \boxed{512}.$
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Compute: $\left(\frac{1}{2} \right)^{3} \cdot \left(\frac{1}{7} \right)$. ### Response:	We have $\left(\frac{1}{2} \right)^{3}=\frac{1}{2} \cdot \frac{1}{2} \cdot \frac{1}{2}=\frac{1}{8}$, so \[\left(\frac{1}{2} \right)^{3} \cdot \left(\frac{1}{7} \right) = \frac18\cdot \frac17 = \boxed{\frac{1}{56}}.\]	Compute: $\left(\frac{1}{2} \right)^{3} \cdot \left(\frac{1}{7} \right)$.	We have $\left(\frac{1}{2} \right)^{3}=\frac{1}{2} \cdot \frac{1}{2} \cdot \frac{1}{2}=\frac{1}{8}$, so \[\left(\frac{1}{2} \right)^{3} \cdot \left(\frac{1}{7} \right) = \frac18\cdot \frac17 = \boxed{\frac{1}{56}}.\]
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: The five-digit number $246\underline{\hspace{5pt}}8$ is divisible by 9. What is the missing digit? ### Response:	In order for a number to be divisible by 9, the sum of its digits must be divisible by 9. Since $2+4+6+8=20$, the only value of the missing digit that causes the sum of the digits to equal a multiple of 9 is $\boxed{7}$, as $27=9\cdot 3$.	The five-digit number $246\underline{\hspace{5pt}}8$ is divisible by 9. What is the missing digit?	In order for a number to be divisible by 9, the sum of its digits must be divisible by 9. Since $2+4+6+8=20$, the only value of the missing digit that causes the sum of the digits to equal a multiple of 9 is $\boxed{7}$, as $27=9\cdot 3$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Calculate 8 divided by $\frac{1}{8}.$ ### Response:	Dividing by a fraction is the same as multiplying by its reciprocal, so $8 \div \frac{1}{8} = 8 \cdot \frac{8}{1} = 8 \cdot 8 = \boxed{64}.$	Calculate 8 divided by $\frac{1}{8}.$	Dividing by a fraction is the same as multiplying by its reciprocal, so $8 \div \frac{1}{8} = 8 \cdot \frac{8}{1} = 8 \cdot 8 = \boxed{64}.$
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Sarah's bowling score was 40 points more than Greg's, and the average of their two scores was 102. What was Sarah's score? (Recall that the average of two numbers is their sum divided by 2.) ### Response:	The average of their scores is halfway between their scores. Thus, since their scores differ by 40, and Sarah's score is higher, her score is $102+\frac{40}{2} = \boxed{122}$. You can do this more precisely by calling Sarah's score $x$, and Greg's score is therefore $x - 40$. Taking an average: $x - 20 = 102$, and thus, $x = 122$.	Sarah's bowling score was 40 points more than Greg's, and the average of their two scores was 102. What was Sarah's score? (Recall that the average of two numbers is their sum divided by 2.)	The average of their scores is halfway between their scores. Thus, since their scores differ by 40, and Sarah's score is higher, her score is $102+\frac{40}{2} = \boxed{122}$. You can do this more precisely by calling Sarah's score $x$, and Greg's score is therefore $x - 40$. Taking an average: $x - 20 = 102$, and thus, $x = 122$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Solve for $p$: $\frac 56 = \frac n{72} = \frac {m+n}{84}= \frac {p - m}{120}$. ### Response:	To get from 6 to 72 we multiply by 12, so a fraction equivalent to $\frac{5}{6}$ whose denominator is 72 has a numerator of $n=5 \cdot12=60$. We can solve $\frac{5}{6}=\frac{60+m}{84}$ similarly to obtain $m=10$. Finally, $\frac{5}{6}=\frac{p-10}{120}\implies p-10=100 \implies p=\boxed{110}$.	Solve for $p$: $\frac 56 = \frac n{72} = \frac {m+n}{84}= \frac {p - m}{120}$.	To get from 6 to 72 we multiply by 12, so a fraction equivalent to $\frac{5}{6}$ whose denominator is 72 has a numerator of $n=5 \cdot12=60$. We can solve $\frac{5}{6}=\frac{60+m}{84}$ similarly to obtain $m=10$. Finally, $\frac{5}{6}=\frac{p-10}{120}\implies p-10=100 \implies p=\boxed{110}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: A square and a triangle have equal perimeters. The lengths of the three sides of the triangle are $6.1$ cm, $8.2$ cm and $9.7$ cm. What is the area of the square in square centimeters? ### Response:	The perimeter of the triangle is $6.1+8.2+9.7=24$ cm. The perimeter of the square is also 24 cm. Each side of the square is $24\div 4=6$ cm. The area of the square is $6^2=\boxed{36}$ square centimeters.	A square and a triangle have equal perimeters. The lengths of the three sides of the triangle are $6.1$ cm, $8.2$ cm and $9.7$ cm. What is the area of the square in square centimeters?	The perimeter of the triangle is $6.1+8.2+9.7=24$ cm. The perimeter of the square is also 24 cm. Each side of the square is $24\div 4=6$ cm. The area of the square is $6^2=\boxed{36}$ square centimeters.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: If $200\%$ of $x$ is equal to $50\%$ of $y$, and $x = 16$, what is the value of $y$? ### Response:	If $200\%$ of $x$ is equal to $50\%$ of $y$, then $400\%$ of $x$ is equal to $y$. If $x = 16$, then $400\%$ of $x$ is $4x = y = \boxed{64}$.	If $200\%$ of $x$ is equal to $50\%$ of $y$, and $x = 16$, what is the value of $y$?	If $200\%$ of $x$ is equal to $50\%$ of $y$, then $400\%$ of $x$ is equal to $y$. If $x = 16$, then $400\%$ of $x$ is $4x = y = \boxed{64}$.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: The Benton Youth Soccer Team has 20 players on the team, including reserves. Of these, three are goalies. Today, the team is having a contest to see which goalie can block the most number of penalty kicks. For each penalty kick, a goalie stands in the net while the rest of the team (including other goalies) takes a shot on goal, one at a time, attempting to place the ball in the net. How many penalty kicks must be taken to ensure that everyone has gone up against each of the goalies? ### Response:	For each of the $3$ goalies who stand in the net, there are $19$ other players who will kick to the goalie. That makes $3 \cdot 19 = \boxed{57}$ penalty kicks that must be taken.	The Benton Youth Soccer Team has 20 players on the team, including reserves. Of these, three are goalies. Today, the team is having a contest to see which goalie can block the most number of penalty kicks. For each penalty kick, a goalie stands in the net while the rest of the team (including other goalies) takes a shot on goal, one at a time, attempting to place the ball in the net. How many penalty kicks must be taken to ensure that everyone has gone up against each of the goalies?	For each of the $3$ goalies who stand in the net, there are $19$ other players who will kick to the goalie. That makes $3 \cdot 19 = \boxed{57}$ penalty kicks that must be taken.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: How many different 7-digit positive integers exist? (Note that we don't allow "7-digit" integers that start with 0, such as 0123456; this is actually a 6-digit integer.) ### Response:	There are 9 choices for the first digit (it can be 1-9) and 10 choices for each of the other 6 digits (they can be 0-9). So there are $9 \cdot 10^6 = \boxed{9,\!000,\!000}$ possible numbers.	How many different 7-digit positive integers exist? (Note that we don't allow "7-digit" integers that start with 0, such as 0123456; this is actually a 6-digit integer.)	There are 9 choices for the first digit (it can be 1-9) and 10 choices for each of the other 6 digits (they can be 0-9). So there are $9 \cdot 10^6 = \boxed{9,\!000,\!000}$ possible numbers.
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: Of the 36 students in Richelle's class, 12 prefer chocolate pie, 8 prefer apple, and 6 prefer blueberry. Half of the remaining students prefer cherry pie and half prefer lemon. For Richelle's pie graph showing this data, how many degrees should she use for cherry pie? ### Response:	Since $12 + 8 + 6 = 26$, there are $36-26= 10$ children who prefer cherry or lemon pie. These ten are divided into equal parts of 5 each. \[ \frac{5}{36} \times 360^{\circ} = 5 \times 10^{\circ} = \boxed{50^{\circ}}. \]	Of the 36 students in Richelle's class, 12 prefer chocolate pie, 8 prefer apple, and 6 prefer blueberry. Half of the remaining students prefer cherry pie and half prefer lemon. For Richelle's pie graph showing this data, how many degrees should she use for cherry pie?	Since $12 + 8 + 6 = 26$, there are $36-26= 10$ children who prefer cherry or lemon pie. These ten are divided into equal parts of 5 each. \[ \frac{5}{36} \times 360^{\circ} = 5 \times 10^{\circ} = \boxed{50^{\circ}}. \]
Below is an instruction that describes a task. Write a response that appropriately completes the request. ### Instruction: How many positive 3-digit numbers are divisible by 7? ### Response:	Note that $7 \times 14 = 98 < 100 < 105 = 7 \times 15$ and $7 \times 142 = 994 < 1000 < 1001 = 7 \times 143$. So the list of 3-digit numbers divisible by 7 is $105,112,\ldots,994$, and when we divide this list by 7, we get the list $15,16,17,\ldots,141,142$, which has $142 - 15 + 1 = \boxed{128}$ numbers.	How many positive 3-digit numbers are divisible by 7?	Note that $7 \times 14 = 98 < 100 < 105 = 7 \times 15$ and $7 \times 142 = 994 < 1000 < 1001 = 7 \times 143$. So the list of 3-digit numbers divisible by 7 is $105,112,\ldots,994$, and when we divide this list by 7, we get the list $15,16,17,\ldots,141,142$, which has $142 - 15 + 1 = \boxed{128}$ numbers.