Difference between revisions of "1970 AHSME Problems/Problem 35"

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(Solution)
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<cmath>k^2x + ak^2 = k^2x + 2pk\sqrt{x} + p^2.</cmath>
 
<cmath>k^2x + ak^2 = k^2x + 2pk\sqrt{x} + p^2.</cmath>
Because both sides have <cmath>k^2x</cmath>, they cancel out. Similarly, the second equation will become <math>bk^2 = q^2 + 2qk\sqrt{X}.</math> Then, <math>a</math> can be multiplied to the second equation and <math>b</math> can be multiplied to the first equation so that the left side of both equations becomes <math>abk^2</math>. Finally, by setting the equations equal to each other, <cmath>bp^2 + 2bpk\sqr{x} = aq^2 + 2aqk\sqrt{X}.</cmath> Isolate <math>k\sqrt{x}</math> to get <math>\fbox{D} = \frac{aq^2-bp^2}{2(bp-aq)}</math>.
+
Because both sides have <cmath>k^2x</cmath>, they cancel out. Similarly, the second equation will become <math>bk^2 = q^2 + 2qk\sqrt{X}.</math> Then, <math>a</math> can be multiplied to the second equation and <math>b</math> can be multiplied to the first equation so that the left side of both equations becomes <math>abk^2</math>. Finally, by setting the equations equal to each other, <cmath>bp^2 + 2bpk\sqr{x} = aq^2 + 2aqk\sqrt{X}</cmath> Isolate <math>k\sqrt{x}</math> to get <math>\fbox{D} = \frac{aq^2-bp^2}{2(bp-aq)}</math>.
<math>\fbox{D}</math>
 
  
 
== See also ==
 
== See also ==

Revision as of 03:42, 2 June 2021

Problem

A retiring employee receives an annual pension proportional to the square root of the number of years of his service. Had he served $a$ years more, his pension would have been $p$ dollars greater, whereas had he served $b$ years more $(b\ne a)$, his pension would have been $q$ dollars greater than the original annual pension. Find his annual pension in terms of $a,b,p$ and $q$.

$\text{(A) } \frac{p^2-q^2}{2(a-b)}\quad \text{(B) } \frac{(p-q)^2}{2\sqrt{ab}}\quad \text{(C) } \frac{ap^2-bq^2}{2(ap-bq)}\quad \text{(D) } \frac{aq^2-bp^2}{2(bp-aq)}\quad \text{(E) } \sqrt{(a-b)(p-q)}$

Solution

Note the original pension as $k\sqrt{x}$, where $x$ is the number of years served. Then, based on the problem statement, two equations can be set up.

\[k\sqrt{x+a} = k\sqrt{x} + p\] \[k\sqrt{x+b} = k\sqrt{x} + q\]

Square the first equation to get

\[k^2x + ak^2 = k^2x + 2pk\sqrt{x} + p^2.\]

Because both sides have \[k^2x\], they cancel out. Similarly, the second equation will become $bk^2 = q^2 + 2qk\sqrt{X}.$ Then, $a$ can be multiplied to the second equation and $b$ can be multiplied to the first equation so that the left side of both equations becomes $abk^2$. Finally, by setting the equations equal to each other,

\[bp^2 + 2bpk\sqr{x} = aq^2 + 2aqk\sqrt{X}\] (Error compiling LaTeX. Unknown error_msg)

Isolate $k\sqrt{x}$ to get $\fbox{D} = \frac{aq^2-bp^2}{2(bp-aq)}$.

See also

1970 AHSC (ProblemsAnswer KeyResources)
Preceded by
Problem 34
Followed by
Problem 35
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