Test a value from each interval to see if it satisfies the original inequality.
Step 1
We will start by solving the related equation.
3x^2+4 > 8x ⇔ 3x^2 + ( - 8)x+ 4 > 0We see above that a= 3, b= - 8, and c= 4. Let's substitute these values into the Quadratic Formula to solve the equation.
Now we can calculate the first root using the positive sign and the second root using the negative sign.
x = 8 ± 4/6
x = 8 + 4/6
x = 8 - 4/6
x = 12/6
x = 4/6
x = 2
x = 2/3
Step 2
The solutions of the related equation are 23 and 2. Let's plot them on a number line. Since the original is a strict inequality, the points will be open.
Step 3
Finally, we must test a value from each interval to see if it satisfies the original inequality. Let's choose a value from the first interval, x < 23. For simplicity, we will choose x=0.
