What are the solutions of this quadratic equation? x² + 4 = 8x + 5 A = 4 ± √7 B = 4 ± √17 C = 8 ± √34 D = 82√17

Question

asked Mar 27, 2023 102k views

1 Answer

Tal Bronfer · Answer 1 · 2023-04-03T04:27:50+0000

Given equation to us is
x^2+4=8x+5

And we need to find out the solutions to the given equation. We can rewrite the equation as ,

$\longrightarrow x^2+4-8x-5=0$

Simplify,

$\longrightarrow x^2-8x-1=0$

Now this equation is in standard form of quadratic equation which is
ax^2+bx+c=0

With respect to the standard form ,

Now we may use the quadratic formula for finding the roots as ,

$\longrightarrow x =(-b\pm√(b^2-4ac))/(2a)\\$

So that,

$\longrightarrow x =(-(-8)\pm√(-8^2-4(1)(-1)))/(2(1))\\$

$\longrightarrow x =(8\pm√(64+4))/(2)\\$

$\longrightarrow x =(8\pm √(68))/(2)\\$

$\longrightarrow x =(8\pm 2√(17))/(2)\\$

$\longrightarrow\underline{\underline{ x = 4\pm √(17)}}$

And we are done!