Solve using the quadratic formula 2x^2+8x-5=0

Question

asked Nov 16, 2021 47.2k views

1 Answer

Asfar Irshad · Answer 1 · 2021-11-22T11:24:19+0000

Explanation:

Hey there!!

Given,

${x}^(2) + 8x - 5 = 0$

Comparing it with ax^2+bx+c =0 we get,

a= 1, b= 8, c= -5.

Using formula,

$x = \frac{ - b + - \sqrt{ {b}^(2) - 4ac } }{2a}$

Keep all values,

$x = \frac{ - 8 + - \sqrt{ {8}^(2) - 4 * 1 * ( - 5)} }{2 * 1}$

x = ( - 8 + - √(64 + 20) )/(2)

x = ( - 8 + - √(84) )/(2)

x = ( - 8 + - 2 √(21) )/(2)

Taking negative,

x = ( - 8 - 2 √(21) )/(2)

x = ( - 2(4 + √(21)) )/(2)

x = 4 + √(21)

Similarly, taking positive,

x = ( - 8 + 2 √(21) )/(2)

x = ( - 2(4 - √(21) ) )/(2)

x = 4 - √(21)

Therefore, x= (4 + root 21, 4 - root 21).

Hope it helps.....