1 Answer

Mohsin Syed · Answer 1 · 2020-02-04T18:10:40+0000

Answer:

The roots are

x=(-5+i√(3))/(2) and
x=(-5-i√(3))/(2)

Explanation:

we have

x^(2) +5x+7

To find the roots equate the polynomial to zero and cmplete the square

x^(2) +5x+7=0

x^(2) +5x=-7

(x^(2) +5x+2.5^(2))=-7+2.5^(2)

(x^(2) +5x+6.25)=-0.75

rewrite as perfect squares

(x+2.5)^(2)=-0.75

take square root both sides

$(x+2.5)=(+/-)\sqrt{-(3)/(4)}$

Remember that

i=√(-1)

substitute

$(x+2.5)=(+/-)i\sqrt{(3)/(4)}$

(x+(5)/(2))=(+/-)i(√(3))/(2)

x=-(5)/(2)(+/-)i(√(3))/(2)

therefore

The roots are

x=(-5+i√(3))/(2)

x=(-5-i√(3))/(2)

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