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1963 TMTA High School Algebra I Contest Problem 14

Revision as of 23:31, 1 February 2021 by Coolmath34 (talk | contribs) (Created page with "== Problem == <math>16x^4 - y^4</math> factored into its real prime factors is equal to: <math>\text{(A)} \quad (4x^2+y^2)(2x-y)^2 \quad \text{(B)} \quad (4x^2+y^2)(4x^2-y)^2...")
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Problem

$16x^4 - y^4$ factored into its real prime factors is equal to:

$\text{(A)} \quad (4x^2+y^2)(2x-y)^2 \quad \text{(B)} \quad (4x^2+y^2)(4x^2-y)^2 \quad \text{(C)} \quad (4x^2+y^2)(2x-y)(2x+y)$

$\text{(D)} \quad 16(x^2+y^2)(x-y)(x+y) \quad \text{(E) can't be factored}$

Solution

We can use difference of squares. \[16x^4 - y^4 = (4x^2+y^2)(4x^2-y^2) = (4x^2+y^2)(2x+y)(2x-y)\] The answer is $\boxed{\text{(C)}}.$

See Also

1963 TMTA High School Mathematics Contests (Problems)
Preceded by
Problem 13 		TMTA High School Mathematics Contest Past Problems/Solutions Followed by
Problem 15
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