Math

QuestionFactor the expression 121r2+4s2121 r^{2}+4 s^{2} in the complex number set.

Studdy Solution

STEP 1

Assumptions1. We are factoring the expression over the set of complex numbers. . The expression to be factored is 121r^ +4s^.

STEP 2

The expression 121r2+4s2121r^2 +4s^2 is a sum of squares, which can be factored using the formula a2+b2=(a+ib)(aib)a^2 + b^2 = (a + ib)(a - ib), where ii is the imaginary unit.

STEP 3

In our case, aa is 11r11r and bb is 2s2s. This is because 121r2=(11r)2121r^2 = (11r)^2 and s2=(2s)2s^2 = (2s)^2.

STEP 4

Substitute 11r11r for aa and 2s2s for bb in the formula a2+b2=(a+ib)(aib)a^2 + b^2 = (a + ib)(a - ib).
121r2+4s2=(11r+2si)(11r2si)121r^2 +4s^2 = (11r +2si)(11r -2si)

STEP 5

So, the factored form of the expression 121r2+4s2121r^2 +4s^2 over the set of complex numbers is (11r+2si)(11r2si)(11r +2si)(11r -2si).
The factored expression is (11r+2si)(11r2si)(11r +2si)(11r -2si).

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