Question

How do you solve the following with the quadratic formula?: `sqrt2x² - x - 3sqrt(2) =0`

Answer 1

`x=(3sqrt2)/2, or, x=-sqrt2`.

Explanation:

Comparing the given quadratic equation with the standard one, i.e.,

`ax^2+bx+c=0`, we have,

`a=sqrt2, b=-1, and c=-3sqrt2`.

As per the quadratic formula, the roots are,

`x={-a+-sqrtDelta}/(2a)," where, "Delta=(b^2-4ac)`.

In our case, `Delta=(-1)^2-4(sqrt2)(-3sqrt2)`,

`=1+24`.

`:. Delta=25," so that, "sqrtDelta=5`.

Hence, `-b+-sqrtDelta=1+-5=6, or, -4`.

Finally, we get the roots : `6/(2sqrt2), or, -4/(2sqrt2),`

`i.e., 3/sqrt2=(3sqrt2)/2, or, -sqrt2`.

Answer 2

`x=-sqrt2,(3sqrt2)/2`

Explanation:

Given: `sqrt2x^2-x-3sqrt2=0`.

Use the quadratic formula, which states that,

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

Here, `a=sqrt2,b=-1,c=-3sqrt2`.

`:.x=(1+-sqrt(1-4*sqrt2*-3sqrt2))/(2sqrt2)`

`=(1+-sqrt(1+24))/(2sqrt2)`

`=(1+-sqrt25)/(2sqrt2)`

`=(1+-5)/(2sqrt2)`

`:.x_1=(1+5)/(2sqrt2)=6/(2sqrt2)=3/sqrt2=(3sqrt2)/2`

`:.x_2=(1-5)/(2sqrt2)=-4/(2sqrt2)=-2/sqrt2=-sqrt2`