Question

How do you find the domain of `f(x)=sqrt((2x^2+5x-3) )`?

Answer 1

`D_f=(-oo,-3]uu[1/2,+oo)`

Explanation:

`f(x)=sqrt(2x^2+5x-3)`

`D_f={AAx` `in` `RR`: `2x^2+5x-3>=0}`

Let's find the roots of `2x^2+5x-3=0`

`Δ=b^2-4ac=25-4*2*(-3)=25+24=49`

`x_(1,2)=(-b+-sqrtΔ)/(2a)` `=` `(-5+-sqrt49)/4` `=` `(-5+-7)/4`

So

• `x_1=2/4=1/2`,
• `x_2=-12/4=-3`

For `x` `in` `(-oo,-3)`
for example `x=-5` `->` `2*(-5)^2+5(-5)-3=50-25-3=22>0`

For `x` `in` `(-3,1/2)`
for example `x=0` `->` `2*0^2+5*0-3=-3<0`

For `x` `in` `(1/2,+oo)`
for example `x=5` `->` `2*(5)^2+5*5-3=50+25-3=72>0`

Therefore `2x^2+5x-3>=0` `<=>` `x` `in` `(-oo,-3]uu[1/2,+oo)`

and `D_f=(-oo,-3]uu[1/2,+oo)`