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30 Oct 2016, 07:36
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
45%
(medium)
Question Stats:
73% (02:37) correct
27%
(02:49)
wrong
based on 2926
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If the sum of the square roots of two integers is \(\sqrt{9+6\sqrt{2}}\), what is the sum of the squares of these two integers?
(A) 40
(B) 43
(C) 45
(D) 48
(C) 52
(A) 40
(B) 43
(C) 45
(D) 48
(C) 52
30 Oct 2016, 10:00
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Bunuel
Let nos be x &y
√x + √y= \(\sqrt{9+6\sqrt{2}}\)
sq both sides.
x+y+2√xy=9+6√2
since x & y are integers
x+y=9----------(1)
and 2√xy=6√2
or √xy=3√2
sq both sides to get xy=18-----(2)
sq . both sides (1)
x^2+y^2+2xy=81
x^2+y^2=81-2xy
x^2+y^2=81-36=45---(as xy=18 from (2))
Ans C
08 Nov 2017, 17:35
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Bunuel
We can let a = the first integer and b = the second integer. Thus:
√a + √b = √(9 + 6√2)
We are asked to find a^2 + b^2.
Let’s square both sides of the equation above.
(√a + √b)^2 = [√(9 + 6√2)]^2
a + 2√ab + b = 9 + 6√2
Since a and b are integers, we must have:
a + b = 9 and 2√ab = 6√2
If we square both sides of a + b = 9, we have:
a^2 + 2ab + b^2 = 81
If we square both sides of 2√ab = 6√2, we have:
4ab = 36(2)
2ab = 36
We can now substitute 36 for 2ab in a^2 + 2ab + b^2 = 81 to obtain:
a^2 + 36 + b^2 = 81
a^2 + b^2 = 45
Answer: C
