Difference between revisions of "1958 AHSME Problems/Problem 47"
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Since <math>\overline{\rm PQ}</math> and <math>\overline{\rm BD}</math> are both perpendicular to <math>\overline{\rm AF}</math>, <math>\overline{\rm PQ} || \overline{\rm BD}</math>. Thus, <math>\angle APQ = \angle ABD</math>. | Since <math>\overline{\rm PQ}</math> and <math>\overline{\rm BD}</math> are both perpendicular to <math>\overline{\rm AF}</math>, <math>\overline{\rm PQ} || \overline{\rm BD}</math>. Thus, <math>\angle APQ = \angle ABD</math>. | ||
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<math>\angle ABD</math> and <math>\angle CAB</math> are also congruent because <math>ABCD</math> is a rectangle. Thus, <math>\angle APQ = \angle ABD = \angle CAB</math>. | <math>\angle ABD</math> and <math>\angle CAB</math> are also congruent because <math>ABCD</math> is a rectangle. Thus, <math>\angle APQ = \angle ABD = \angle CAB</math>. | ||
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Since <math>\angle APQ = \angle CAB</math>, <math>\triangle APT</math> is isosceles with <math>PT = AT</math>. | Since <math>\angle APQ = \angle CAB</math>, <math>\triangle APT</math> is isosceles with <math>PT = AT</math>. | ||
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<math>\angle ATQ</math> and <math>\angle PTR</math> are vertical angles, and thus congruent. Thus, since <math>\angle ATQ = \angle PTR</math>, <math>\angle AQT = \angle PRT = 90 ^{\circ}</math>, and <math>PT = AT</math>, <math>\triangle ATQ \cong \triangle PTR</math>, so <math>AQ = PR</math>. | <math>\angle ATQ</math> and <math>\angle PTR</math> are vertical angles, and thus congruent. Thus, since <math>\angle ATQ = \angle PTR</math>, <math>\angle AQT = \angle PRT = 90 ^{\circ}</math>, and <math>PT = AT</math>, <math>\triangle ATQ \cong \triangle PTR</math>, so <math>AQ = PR</math>. | ||
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We also know that <math>PSFQ</math> is a rectangle, since <math>\overline{\rm PS} \perp \overline{\rm BD}</math>, <math>\overline{\rm BF} \perp \overline{\rm AF}</math>, and <math>\overline{\rm PQ} \perp \overline{\rm AF}</math>. | We also know that <math>PSFQ</math> is a rectangle, since <math>\overline{\rm PS} \perp \overline{\rm BD}</math>, <math>\overline{\rm BF} \perp \overline{\rm AF}</math>, and <math>\overline{\rm PQ} \perp \overline{\rm AF}</math>. | ||
− | Since <math>PSFQ</math> is a rectangle, <math>QF = PS</math>. We also found earlier that <math>AQ = PR</math>. Thus, <math>PR + PS = AQ + QF = AF</math> | + | |
+ | Since <math>PSFQ</math> is a rectangle, <math>QF = PS</math>. We also found earlier that <math>AQ = PR</math>. Thus, <math>PR + PS = AQ + QF = AF</math>. | ||
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Our answer is <math>PR + PS = \fbox{D) AF}</math> | Our answer is <math>PR + PS = \fbox{D) AF}</math> |
Revision as of 00:46, 18 August 2022
Problem
is a rectangle (see the accompanying diagram) with any point on . and . and . Then is equal to:
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Solution
Since and are both perpendicular to , . Thus, .
and are also congruent because is a rectangle. Thus, .
Since , is isosceles with .
and are vertical angles, and thus congruent. Thus, since , , and , , so .
We also know that is a rectangle, since , , and .
Since is a rectangle, . We also found earlier that . Thus, .
Our answer is
See Also
1958 AHSC (Problems • Answer Key • Resources) | ||
Preceded by Problem 46 |
Followed by Problem 48 | |
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 • 26 • 27 • 28 • 29 • 30 • 31 • 32 • 33 • 34 • 35 • 36 • 37 • 38 • 39 • 40 • 41 • 42 • 43 • 44 • 45 • 46 • 47 • 48 • 49 • 50 | ||
All AHSME Problems and Solutions |
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