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21 Jul 2022, 01:30
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90% (02:34) correct
10%
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Peter lives 12 miles west of school and Bill lives north of the school. Peter finds that the direct distance from his house to Bill's is 6 miles shorter than the distance by way of school. How many miles north of the school does Bill live?
(A) 6
(B) 9
(C) 10
(D) 6√2
(E) None of these
Are You Up For the Challenge: 700 Level Questions
(A) 6
(B) 9
(C) 10
(D) 6√2
(E) None of these
Are You Up For the Challenge: 700 Level Questions
21 Jul 2022, 07:12
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The horizontal distance Peter-School a=12 miles
The vertical distance Bill-School b=x
The distance a+b=12+x
The direct distance Peter-Bill (hypotenuse of the triangle) c = a+b-6 => c=12+x-6 c=x+6
To find the direct distance Peter-Bill hence the hypotenuse we can just apply the Pythagorean theorem
\sqrt{(6+x)^2 +12^2} = x
\sqrt{36+x^2 +12x-144} = x
Raising everything to the power of 2, to get rid of the square root
12x-108=0
x=108/12 = 9 x=9
The vertical distance Bill-School b=x
The distance a+b=12+x
The direct distance Peter-Bill (hypotenuse of the triangle) c = a+b-6 => c=12+x-6 c=x+6
To find the direct distance Peter-Bill hence the hypotenuse we can just apply the Pythagorean theorem
\sqrt{(6+x)^2 +12^2} = x
\sqrt{36+x^2 +12x-144} = x
Raising everything to the power of 2, to get rid of the square root
12x-108=0
x=108/12 = 9 x=9
21 Jul 2022, 08:28
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Peter lives 12 miles west of school and Bill lives north of the school. Peter finds that the direct distance from his house to Bill's is 6 miles shorter than the distance by way of school. How many miles north of the school does Bill live?
(A) 6
(B) 9
(C) 10
(D) 6√2
(E) None of these
(A) 6
(B) 9
(C) 10
(D) 6√2
(E) None of these
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