Difference between revisions of "2018 AMC 10A Problems/Problem 21"
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+ | {{duplicate|[[2018 AMC 10A Problems/Problem 21|2018 AMC 10A #21]] and [[2018 AMC 12A Problems/Problem 16|2018 AMC 12A #16]]}} | ||
+ | |||
== Problem == | == Problem == | ||
Line 11: | Line 13: | ||
</math> | </math> | ||
− | == Solution 1 == | + | == Solution 1 (Algebra) == |
− | |||
Substituting <math>y=x^2-a</math> into <math>x^2+y^2=a^2</math>, we get | Substituting <math>y=x^2-a</math> into <math>x^2+y^2=a^2</math>, we get | ||
− | <cmath> | + | <cmath>x^2+(x^2-a)^2=a^2 \implies x^2+x^4-2ax^2=0 \implies x^2(x^2-(2a-1))=0</cmath> |
− | x^2+(x^2-a)^2=a^2 \implies x^2+x^4-2ax^2=0 \implies x^2(x^2-(2a-1))=0 | + | Since this is a quartic, there are <math>4</math> total roots (counting multiplicity). We see that <math>x=0</math> always has at least one intersection at <math>(0,-a)</math> (and is in fact a double root). |
− | </cmath> | ||
− | Since this is a quartic, there are 4 total roots (counting multiplicity). We see that <math>x=0</math> always at least one intersection at <math>(0,-a)</math> (and is in fact a double root). | ||
− | The other two intersection points have <math>x</math> coordinates <math>\pm\sqrt{2a-1}</math>. We must have <math>2a-1> 0 | + | The other two intersection points have <math>x</math> coordinates <math>\pm\sqrt{2a-1}</math>. We must have <math>2a-1> 0;</math> otherwise we are in the case where the parabola lies entirely below the circle (tangent at the point <math>(0,-a)</math>). This only results in a single intersection point in the real coordinate plane. Thus, we see that <math>\boxed{\textbf{(E) }a>\frac12}</math>. |
(projecteulerlover) | (projecteulerlover) | ||
− | == Solution 2 == | + | == Solution 2 (Algebra) == |
+ | Substituting <math>y = x^2 - a</math> gives <math>x^2 + (x^2 - a)^2 = a^2</math>, which simplifies to <math>x^2 + x^4 - 2x^2a + a^2 = a^2</math>. This further simplifies to <math>x^2(1 + x^2 - 2a) = 0</math>. Thus, either <math>x^2 = 0</math>, or <math>x^2 - 2a + 1 = 0</math>. | ||
+ | Since we care about <math>a</math>, we consider the second case. We solve in terms of <math>a</math>, giving <math>a = \frac{x^2}{2} + \frac{1}{2}</math>. We see that in order to find the range in which <math>a</math> lies, we must find the vertex of this equation, which turns out to be <math>\left(0, \frac{1}{2}\right)</math>. Hence, we know that the minimum is <math>\frac{1}{2}</math>, which further implies that <math>\boxed{\textbf{(E) }a>\frac12}</math>. | ||
+ | |||
+ | == Solution 3 (Graphs) == | ||
<asy> | <asy> | ||
Label f; | Label f; | ||
Line 47: | Line 50: | ||
</asy> | </asy> | ||
− | Looking at a graph, it is obvious that the two curves intersect at (0, -a). We also see that if the parabola goes | + | Looking at a graph, it is obvious that the two curves intersect at <math>(0, -a)</math>. We also see that if the parabola goes "in" the circle, then by going out of it (as it will), it will intersect five times. This is impossible. Thus, we only look for cases where the parabola becomes externally tangent to the circle. |
+ | |||
+ | We have <math>x^2 - a = -\sqrt{a^2 - x^2}</math>. Squaring both sides and solving yields <math>x^4 - (2a - 1)x^2 = 0</math>. Since <math>x = 0</math> is already accounted for, we only need to find one solution for <math>x^2 = 2a - 1</math>, where the right hand side portion is obviously increasing. Since <math>a = \frac{1}{2}</math> begets <math>x = 0</math> (an overcount), we have <math>\boxed{\textbf{(E) }a>\frac12}</math> as the right answer. | ||
Solution by JohnHankock | Solution by JohnHankock | ||
− | == Solution | + | == Solution 4 (Graphs) == |
− | + | This describes a unit parabola, with a circle centered on the axis of symmetry and tangent to the vertex. As the curvature of the unit parabola at the vertex is <math>2</math>, the radius of the circle that matches it has a radius of <math>\frac{1}{2}</math>. This circle is tangent to an infinitesimally close pair of points, one on each side. Therefore, it is tangent to only <math>1</math> point. When a larger circle is used, it is tangent to <math>3</math> points because the points on either side are now separated from the vertex. Therefore, <math>\boxed{\textbf{(E) }a>\frac12}</math> is correct. | |
− | + | <math>QED \blacksquare</math> | |
− | == Solution 4 (Calculus | + | == Solution 5 (Graphs) == |
+ | Now, let's graph these two equations. We want the blue parabola to be inside this red circle. | ||
+ | <asy> | ||
+ | import graph; | ||
+ | size(6cm); | ||
+ | draw((0,0)--(0,10),EndArrow); | ||
+ | draw((0,0)--(0,-10),EndArrow); | ||
+ | draw((0,0)--(10,0),EndArrow); | ||
+ | draw((0,0)--(-10,0),EndArrow); | ||
+ | Label f; | ||
+ | f.p=fontsize(6); | ||
+ | xaxis(-10,10); | ||
+ | yaxis(-10,10); | ||
+ | real f(real x) | ||
+ | { | ||
+ | return x^2-5; | ||
+ | } | ||
+ | draw(graph(f,-4,4),blue+linewidth(1)); | ||
+ | draw(circle((0,0),5),red); | ||
+ | dot(scale(.7)*"$a$",(0,5),NE); | ||
+ | dot(scale(.7)*"$-a$",(0,-5),N); | ||
+ | dot(scale(.7)*"$a$",(5,0),NE); | ||
+ | dot(scale(.7)*"$-a$",(-5,0),SE); | ||
+ | </asy> | ||
+ | Then we substitute <math>y</math> into the first equation to get <math>x^2+(x^2-a)^2=a^2</math>. Expanding, we get <math>x^4-2ax^2+x^2=0</math>. Factoring out the <math>x^2</math>, we get <math>x^2(x^2-2a+1)=0</math>. Then we find that <math>x=0</math> or <math>x=\pm\sqrt{2a-1}</math>. Therefore, <math>2a-1>0</math>, which means <math>\boxed{\textbf{(E) }a>\frac12}</math>. | ||
+ | |||
+ | - kante314 - | ||
+ | ~ minor edit by junokim1011 and RJ5303707 | ||
+ | |||
+ | == Solution 6 (Calculus) == | ||
In order to solve for the values of <math>a</math>, we need to just count multiplicities of the roots when the equations are set equal to each other: in other words, take the derivative. We know that <math>\sqrt{a^2 - x^2} = x^2 - a</math>. Now, we take square of both sides, and rearrange to obtain <math>x^4 - (2a - 1)x^2 = 0</math>. Now, we may take the second derivative of the equation to obtain <math>6x^2 - (2a - 1) = 0</math>. Now, we must take discriminant. Since we need the roots of that equation to be real and not repetitive (otherwise they would not intersect each other at three points), the discriminant must be greater than zero. Thus, | In order to solve for the values of <math>a</math>, we need to just count multiplicities of the roots when the equations are set equal to each other: in other words, take the derivative. We know that <math>\sqrt{a^2 - x^2} = x^2 - a</math>. Now, we take square of both sides, and rearrange to obtain <math>x^4 - (2a - 1)x^2 = 0</math>. Now, we may take the second derivative of the equation to obtain <math>6x^2 - (2a - 1) = 0</math>. Now, we must take discriminant. Since we need the roots of that equation to be real and not repetitive (otherwise they would not intersect each other at three points), the discriminant must be greater than zero. Thus, | ||
− | < | + | <cmath>b^2 - 4ac > 0 \rightarrow 0 - 4(6)(-(2a - 1)) > 0 \rightarrow a > \frac{1}{2}</cmath> |
− | b^2 - 4ac > 0 \rightarrow 0 - 4(6)(-(2a - 1)) > 0 \rightarrow a > \frac{1}{2} | ||
− | </ | ||
The answer is <math>\boxed{\textbf{(E) }a>\frac12}</math> and we are done. | The answer is <math>\boxed{\textbf{(E) }a>\frac12}</math> and we are done. | ||
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(Edited by OlutosinNGA) | (Edited by OlutosinNGA) | ||
− | == Solution | + | == Solution 7 (Calculus) == |
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | Notice, the equations are of that of a circle of radius a centered at the origin and a parabola translated down by a units. They always intersect at the point <math>(0, a)</math>, and they have symmetry across the y-axis, thus, for them to intersect at exactly 3 points, it suffices to find the y solution. | + | Notice, the equations are of that of a circle of radius a centered at the origin and a parabola translated down by a units. They always intersect at the point <math>(0, a)</math>, and they have symmetry across the <math>y</math>-axis, thus, for them to intersect at exactly <math>3</math> points, it suffices to find the <math>y</math> solution. |
First, rewrite the second equation to <math>y=x^2-a\implies x^2=y+a</math> | First, rewrite the second equation to <math>y=x^2-a\implies x^2=y+a</math> | ||
And substitute into the first equation: <math>y+a+y^2=a^2</math> | And substitute into the first equation: <math>y+a+y^2=a^2</math> | ||
− | Since we're only interested in seeing the interval in which a can exist, we find the discriminant: <math>1-4a+4a^2</math>. This value must not be less than 0 (It is the square root part of the quadratic formula). To find when it is 0, we find the roots: | + | Since we're only interested in seeing the interval in which a can exist, we find the discriminant: <math>1-4a+4a^2</math>. This value must not be less than <math>0</math> (It is the square root part of the quadratic formula). To find when it is <math>0</math>, we find the roots: |
<cmath>4a^2-4a+1=0 \implies a=\frac{4\pm\sqrt{16-16}}{8}=\frac{1}{2}</cmath> | <cmath>4a^2-4a+1=0 \implies a=\frac{4\pm\sqrt{16-16}}{8}=\frac{1}{2}</cmath> | ||
Since <math>\lim_{a\to \infty}(4a^2-4a+1)=\infty</math>, our range is <math>\boxed{\textbf{(E) }a>\frac12}</math>. | Since <math>\lim_{a\to \infty}(4a^2-4a+1)=\infty</math>, our range is <math>\boxed{\textbf{(E) }a>\frac12}</math>. | ||
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Solution by ktong | Solution by ktong | ||
− | == Solution | + | == Solution 8 (Observations) == |
− | Simply plug in <math>a = | + | |
+ | We can see that if <math>a = 1</math>, we know that the points where the two curves intersect are <math>(0, -1), (1, 0)</math> and <math>(-1, 0)</math> .Because there are only <math>3</math> intersections and <math>a > 1/2</math>, as well as <math>a > 1/4</math> we know that either <math>\textbf{(D)}</math> or <math>\textbf{(E)}</math> is the correct answer. Then we can test a number from <math>(1/2, 1/4)</math> to eliminate the remaining answer. So <math>\boxed{\textbf{(E) }a>\frac12}</math> is the correct answer. | ||
+ | |||
+ | ~josephwidjaja (Solution) | ||
+ | |||
+ | ~username_taken12 (Revision) | ||
+ | |||
+ | == Solution 9 (Observations) == | ||
+ | Simply plug in <math>a = \frac{1}{2}, \frac{1}{4}, 1</math> and solve the systems. (This shouldn't take too long.) And then realize that only <math>a=1</math> yields three real solutions for <math>x</math>, so we are done and the answer is <math>\boxed{\textbf{(E) }a>\frac12}</math>. | ||
~ ccx09 | ~ ccx09 | ||
− | == Solution | + | ==Solution 10 (Observations)== |
− | + | An ideal solution come to mind is where they intersect at the <math>x</math>-axis at the same time, which is <math>(a, 0)</math> and <math>(-a, 0).</math> Take the root of our <math>y=x^2-a</math> we get <math>x=\sqrt{a}</math>, set them equal we get <math>a=\sqrt{a}.</math> The only answer is <math>1</math> so it only left us with the answer choice <math>\boxed{\textbf{(E) }a>\frac12}</math>. | |
+ | |||
+ | ~@azure123456 | ||
+ | |||
+ | ==Solution 11 (Curvature)== | ||
+ | From observing the graph of the two functions, we notice that there will be exactly 3 solutions when the curvature of <math>y = x^2-a</math> is greater than the curvature of the circle <math>x^2+y^2 = a^2</math> near <math>x=0</math> (this means the graph of <math>y=x^2-a</math> will reside within the circle). Curvature can be calculated by: | ||
+ | <cmath>\kappa = \frac{y^{\prime\prime}}{(1+(y^{\prime})^2)^\frac{3}{2}}</cmath> | ||
+ | For a circle, curvature is just the inverse of the radius or <math>1/a</math> in our case. For the parabola, we use the equation above: | ||
+ | <cmath>\kappa = \frac{y^{\prime\prime}}{(1+(y^{\prime})^2)} = \frac{2}{(1+4x^2)^{1.5}}</cmath> | ||
+ | where <math>\kappa \approx 2</math> when <math>x \approx 0</math>. Since curvature of the parabola should be greater than that of the circle, <math>2>\frac{1}{a}</math> or answer choice <math>\boxed{\textbf{(E) }a>\frac12}</math>. | ||
+ | |||
+ | ~Chupdogs | ||
+ | |||
+ | == Remark == | ||
+ | The graph of <math>x^2+y^2=a^2</math> is a circle with the center <math>(0,0)</math> and the radius <math>|a|.</math> | ||
+ | |||
+ | The graph of <math>y=x^2-a</math> is an upward-opening parabola with the vertex <math>(0,-a).</math> | ||
+ | |||
+ | The circle and the parabola are shown here in Desmos: https://www.desmos.com/calculator/rfeknuhjum | ||
+ | |||
+ | Move the slider around for <math>\frac12\leq a\leq5</math> to observe that they intersect at exactly <math>3</math> points: <math>(0,-a)</math> and <math>\left(\pm\sqrt{2a-1},a-1\right),</math> provided that <math>a>\frac12.</math> | ||
+ | |||
+ | ~MRENTHUSIASM | ||
+ | |||
+ | == Video Solution by Pi Academy (Fast and easy Algebra) == | ||
+ | |||
+ | https://youtu.be/UvzCuc_VjAY?si=eITJBLBQMPnl6D7F | ||
+ | |||
+ | ~ Pi Academy | ||
+ | |||
− | + | == Video Solution by Richard Rusczyk == | |
https://artofproblemsolving.com/videos/amc/2018amc10a/466 | https://artofproblemsolving.com/videos/amc/2018amc10a/466 |
Latest revision as of 20:03, 11 October 2024
- The following problem is from both the 2018 AMC 10A #21 and 2018 AMC 12A #16, so both problems redirect to this page.
Contents
- 1 Problem
- 2 Solution 1 (Algebra)
- 3 Solution 2 (Algebra)
- 4 Solution 3 (Graphs)
- 5 Solution 4 (Graphs)
- 6 Solution 5 (Graphs)
- 7 Solution 6 (Calculus)
- 8 Solution 7 (Calculus)
- 9 Solution 8 (Observations)
- 10 Solution 9 (Observations)
- 11 Solution 10 (Observations)
- 12 Solution 11 (Curvature)
- 13 Remark
- 14 Video Solution by Pi Academy (Fast and easy Algebra)
- 15 Video Solution by Richard Rusczyk
- 16 See Also
Problem
Which of the following describes the set of values of for which the curves and in the real -plane intersect at exactly points?
Solution 1 (Algebra)
Substituting into , we get Since this is a quartic, there are total roots (counting multiplicity). We see that always has at least one intersection at (and is in fact a double root).
The other two intersection points have coordinates . We must have otherwise we are in the case where the parabola lies entirely below the circle (tangent at the point ). This only results in a single intersection point in the real coordinate plane. Thus, we see that .
(projecteulerlover)
Solution 2 (Algebra)
Substituting gives , which simplifies to . This further simplifies to . Thus, either , or .
Since we care about , we consider the second case. We solve in terms of , giving . We see that in order to find the range in which lies, we must find the vertex of this equation, which turns out to be . Hence, we know that the minimum is , which further implies that .
Solution 3 (Graphs)
Looking at a graph, it is obvious that the two curves intersect at . We also see that if the parabola goes "in" the circle, then by going out of it (as it will), it will intersect five times. This is impossible. Thus, we only look for cases where the parabola becomes externally tangent to the circle.
We have . Squaring both sides and solving yields . Since is already accounted for, we only need to find one solution for , where the right hand side portion is obviously increasing. Since begets (an overcount), we have as the right answer.
Solution by JohnHankock
Solution 4 (Graphs)
This describes a unit parabola, with a circle centered on the axis of symmetry and tangent to the vertex. As the curvature of the unit parabola at the vertex is , the radius of the circle that matches it has a radius of . This circle is tangent to an infinitesimally close pair of points, one on each side. Therefore, it is tangent to only point. When a larger circle is used, it is tangent to points because the points on either side are now separated from the vertex. Therefore, is correct.
Solution 5 (Graphs)
Now, let's graph these two equations. We want the blue parabola to be inside this red circle. Then we substitute into the first equation to get . Expanding, we get . Factoring out the , we get . Then we find that or . Therefore, , which means .
- kante314 - ~ minor edit by junokim1011 and RJ5303707
Solution 6 (Calculus)
In order to solve for the values of , we need to just count multiplicities of the roots when the equations are set equal to each other: in other words, take the derivative. We know that . Now, we take square of both sides, and rearrange to obtain . Now, we may take the second derivative of the equation to obtain . Now, we must take discriminant. Since we need the roots of that equation to be real and not repetitive (otherwise they would not intersect each other at three points), the discriminant must be greater than zero. Thus,
The answer is and we are done.
~awesome1st
(Edited by OlutosinNGA)
Solution 7 (Calculus)
Notice, the equations are of that of a circle of radius a centered at the origin and a parabola translated down by a units. They always intersect at the point , and they have symmetry across the -axis, thus, for them to intersect at exactly points, it suffices to find the solution.
First, rewrite the second equation to And substitute into the first equation: Since we're only interested in seeing the interval in which a can exist, we find the discriminant: . This value must not be less than (It is the square root part of the quadratic formula). To find when it is , we find the roots: Since , our range is .
Solution by ktong
Solution 8 (Observations)
We can see that if , we know that the points where the two curves intersect are and .Because there are only intersections and , as well as we know that either or is the correct answer. Then we can test a number from to eliminate the remaining answer. So is the correct answer.
~josephwidjaja (Solution)
~username_taken12 (Revision)
Solution 9 (Observations)
Simply plug in and solve the systems. (This shouldn't take too long.) And then realize that only yields three real solutions for , so we are done and the answer is .
~ ccx09
Solution 10 (Observations)
An ideal solution come to mind is where they intersect at the -axis at the same time, which is and Take the root of our we get , set them equal we get The only answer is so it only left us with the answer choice .
~@azure123456
Solution 11 (Curvature)
From observing the graph of the two functions, we notice that there will be exactly 3 solutions when the curvature of is greater than the curvature of the circle near (this means the graph of will reside within the circle). Curvature can be calculated by: For a circle, curvature is just the inverse of the radius or in our case. For the parabola, we use the equation above: where when . Since curvature of the parabola should be greater than that of the circle, or answer choice .
~Chupdogs
Remark
The graph of is a circle with the center and the radius
The graph of is an upward-opening parabola with the vertex
The circle and the parabola are shown here in Desmos: https://www.desmos.com/calculator/rfeknuhjum
Move the slider around for to observe that they intersect at exactly points: and provided that
~MRENTHUSIASM
Video Solution by Pi Academy (Fast and easy Algebra)
https://youtu.be/UvzCuc_VjAY?si=eITJBLBQMPnl6D7F
~ Pi Academy
Video Solution by Richard Rusczyk
https://artofproblemsolving.com/videos/amc/2018amc10a/466
~ dolphin7
See Also
2018 AMC 10A (Problems • Answer Key • Resources) | ||
Preceded by Problem 20 |
Followed by Problem 22 | |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 • 16 • 17 • 18 • 19 • 20 • 21 • 22 • 23 • 24 • 25 | ||
All AMC 10 Problems and Solutions |
2018 AMC 12A (Problems • Answer Key • Resources) | |
Preceded by Problem 15 |
Followed by Problem 17 |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 • 16 • 17 • 18 • 19 • 20 • 21 • 22 • 23 • 24 • 25 | |
All AMC 12 Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.