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09 Oct 2023, 03:29
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
55%
(hard)
Question Stats:
73% (02:00) correct
27%
(02:07)
wrong
based on 1482
sessions
History
Date
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If \(x = 3 - \sqrt{2}\), which of the following has the value 0 for some integer k?
(A) \(x^2 + kx - 7\)
(B) \(x^2 - 6x + k\)
(C) \(x^2 + 6x + k\)
(D) \(x^2 - 7x + k\)
(E) \(x^2 + 7x + k\)
GMAT-Club-Forum-rg3ssd0i.png [ 46.66 KiB | Viewed 8601 times ]
(A) \(x^2 + kx - 7\)
(B) \(x^2 - 6x + k\)
(C) \(x^2 + 6x + k\)
(D) \(x^2 - 7x + k\)
(E) \(x^2 + 7x + k\)
Attachment:
GMAT-Club-Forum-rg3ssd0i.png [ 46.66 KiB | Viewed 8601 times ]
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05 Mar 2024, 22:37
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Here is an easier approach:
\(x = 3 - \sqrt{2}\)
Bring 3 to the left side and square both the sides.
\((x-3)^2 = (-\sqrt{2})^2\)
solve and you get:
\(x^2 + 9 - 6x = 2\)
\(x^2 - 6x +7 = 0\)
Only option B matches.
\(x = 3 - \sqrt{2}\)
Bring 3 to the left side and square both the sides.
\((x-3)^2 = (-\sqrt{2})^2\)
solve and you get:
\(x^2 + 9 - 6x = 2\)
\(x^2 - 6x +7 = 0\)
Only option B matches.
22 Aug 2024, 23:05
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Here's a really quick and efficient solution -
Observation 1: All choices are quadratic expressions.
Recall Concept 1: For a quadratic equation, Irrational roots always occur in conjugate pairs.
So, If 3 - √2 is a root, then so is 3 + √2.
Recall Concept 2: Sum of roots of a quadratic equation = -(Coefficient of x)/(Coefficient of x^2)
So, (3 + √2) + (3 - √2) = 6 = -b/a [Say]
Choice Analysis: Only choice B satisfies this!
Hope this helps!
Observation 1: All choices are quadratic expressions.
Recall Concept 1: For a quadratic equation, Irrational roots always occur in conjugate pairs.
So, If 3 - √2 is a root, then so is 3 + √2.
Recall Concept 2: Sum of roots of a quadratic equation = -(Coefficient of x)/(Coefficient of x^2)
So, (3 + √2) + (3 - √2) = 6 = -b/a [Say]
Choice Analysis: Only choice B satisfies this!
Hope this helps!
