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34 votes
34 votes
Please I'm in urgent need of help. what must be added to make (1/4)x^2-(2/3)xy a perfect square?.​

User Peter DeWeese
by
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2 Answers

26 votes
26 votes

Answer:


\bigg((2)/(3) {y} \bigg)^(2)

STEP BY STEP EXPLANATION


(1)/(4) {x}^(2) - \bigg( (2)/(3) \bigg)xy \\ \\ = \bigg((1)/(2) {x} \bigg)^(2) - 2. \bigg((1)/(2) {x} \bigg)\bigg( (2)/(3) y \bigg ) + \bigg((2)/(3) {y} \bigg)^(2) \\ \\ = \bigg((1)/(2) {x} - (2)/(3) y\bigg)^(2) \\

To make
\red{\bold{(1)/(4) {x}^(2) - \bigg( (2)/(3) \bigg)xy}} a perfect square we should add
\purple{\bold{\bigg((2)/(3) {y} \bigg)^(2)}}

User Pavel Ryzhov
by
2.9k points
17 votes
17 votes

Answer:


  • 4/9y^2

Explanation:

Given:


  • (1/4)x^2-(2/3)xy

Consider the identity:


  • (a - b)^2=a^2-2ab+b^2

We can see that:


  • a^2=(1/2x)^2

  • a = (1/2)x

  • 2ab = (2/3)xy

We can work out the value of b:


  • 2ab = (2/3)xy = 2(1/2x)(2/3y)

  • b=(2/3)y

Then we are missing b², what needs to be added:


  • b^2=(2/3y)^2=4/9y^2
User Sasha Zoria
by
2.3k points