Question

Solve by using the quadratic formula?

`3k^2 - 18k + 22 = 0`

Answer 1

`k=3+-sqrt15/3`

Explanation:

.

If we have a quadratic function in the form of:

`ax^2+bx+c=0`, then

`x=(-b+-sqrt(b^2-4ac))/(2a)`

`k=(-(-18)+-sqrt((-18)^2-4(3)(22)))/(2(3))=(18+-sqrt(324-264))/6=(18+-sqrt60)/6=(18+-2sqrt15)/6=(9+-sqrt15)/3`

`k=3+-sqrt15/3`

Answer 2

`k=3+-sqrt15/3`

Explanation:

Here,

`3k^2-18k+22=0`

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

`a=3, b=-18and c=22`

`triangle=b^2-4ac=324-4(3)(22)=324-264=60`

`sqrt(triangle)=sqrt60=2sqrt15`

So,

#k=(-b+-sqrt(triangle))/(2a)=(18+-2sqrt15)/(2xx3)=18/6+- (2sqrt15)/6#

`:.k=3+-sqrt15/3`