Finding the X-Intercepts of the Equation
The x-intercepts of a parabola are the points where the graph intersects the x-axis. This occurs when the value of y is equal to zero. To find the x-intercepts of the equation y = 2x² + 3x – 20, we need to set y to zero and solve for x:
Step 1: Set the equation to zero
0 = 2x² + 3x - 20
This is a quadratic equation in the standard form ax² + bx + c = 0, where:
- a = 2
- b = 3
- c = -20
Step 2: Use the quadratic formula
To find the values of x, we can use the quadratic formula:
x = (-b ± √(b² - 4ac)) / (2a)
Substituting in our values:
x = (–3 ± √(3² - 4(2)(–20))) / (2(2))
Now, calculate the discriminant:
- 3² = 9
- 4 × 2 × –20 = –160
- So, 9 + 160 = 169
The discriminant is positive (169), which means there will be two distinct real roots.
Step 3: Calculate the roots
x = (–3 ± √169) / 4
Since √169 = 13, we have:
x = (–3 ± 13) / 4
Now calculate the two possible values of x:
- For the positive root:
- For the negative root:
x = (–3 + 13) / 4 = 10 / 4 = 2.5
x = (–3 - 13) / 4 = –16 / 4 = –4
Conclusion
The x-intercepts of the equation y = 2x² + 3x – 20 are:
- (2.5, 0)
- (–4, 0)