Question

How do you find the value of the discriminant and state the type of solutions given `5b^2+b-2=0`?

Answer 1

`D=41` , two real solutions and `b ~~ -0.74 , b ~~ 0.54`.

Explanation:

`5b^2+b-2 =0` . Comparing with standard quadratic equation

`ax^2+bx+c=0` we get here `a=5 ,b =1 ,c =-2`

Discriminant `D = b^2-4*a*c = 1 -4*5*(-2)=1+40=41`

If `D` is positive, we will get two real solutions, if it is zero we get

just one solution, and if it is negative we get complex solutions.

Here `D` is positive , so there are two real solution.

`b= (-b +- sqrt(D))/(2a) or b= (-1+- sqrt41)/10` or

`:. b ~~ -0.74(2 dp) , b ~~ 0.54(2dp)` [Ans]