(2r+3)²+(r+4)²=10 into the form of ax²+bc+c=0...How do you solve that?

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asked Feb 20, 2023 162k views

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Ross Rogers · Answer 1 · 2023-02-24T02:54:30+0000

It is given that:

Use the following formula to open the two brackets in the LHS.

Solve the given question as follows:

$\begin{gathered} (2r)^2+2(2r)(3)+3^2+r^2+2(r)(4)+4^2=10 \\ 4r^2+12r+9+r^2+8r+16=10 \\ 5r^2+20r+25-10=0 \\ 5r^2+20r+15=0 \\ r^2+4r+3=0 \end{gathered}$
$\begin{gathered} \text{ Hence the form given by }ax^2+bx+c=0\text{ is obtained which is:} \\ r^2+4r+3=0 \end{gathered}$

Hence a=1,b=4,c=3.

(2r+3)²+(r+4)²=10 into the form of ax²+bc+c=0...How do you solve that?

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