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Chris Simeone · Answer 1 · 2020-05-13T08:04:00+0000

Answer:

y= 3(x+5)^2 -4 , (-5, -4)

Explanation:

We are given the following equation and we are to complete its square:

y = 3x^2 + 30x + 71

y = 3(x^2 + 10x) + 71

y = 3(x^2 + 10x + 5^2 - 5^2) + 71

y= 3(x^2 +10x +25) +3(-25) + 71

y= 3(x+5)(x+5) -75 + 71

y= 3(x+5)^2 -4

So out extreme values of the equation is (-5, -4).

Ybdesire · Answer 2 · 2020-05-15T01:50:04+0000

ANSWER

$y = 3{(x + 5})^(2)-4$

The extreme values are

(-5,-4)

EXPLANATION

The given equation is

$y = 3 {x}^(2) + 30x+71$

Factor 3 from the first two terms,

$y = 3( {x}^(2) + 10x) + 71$

Add and subtract the square of half the coefficient of x.

$y = 3( {x}^(2) + 10x + 25) + 71 - 3(25)$

$y = 3{(x + 5})^(2)+ 71-75$

$y = 3{(x + 5})^(2) -4$

The extreme values are

(-5,-4)

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