All High School Math Resources
Example Questions
Example Question #2 : Understanding The Discriminant
Use the discriminant to determine the nature of the roots:
Cannot be determined
real root
imaginary roots
imaginary root
real roots
imaginary roots
The formula for the discriminant is:
Since the discriminant is negative, there are imaginary roots.
Example Question #1 : Discriminants
Given , what is the value of the discriminant?
In general, the discriminant is .
In this particual case .
Plug in these three values and simplify:
Example Question #51 : Intermediate Single Variable Algebra
Write an equation with the given roots:
To write an equation, find the sum and product of the roots. The sum is the negative coefficient of , and the product is the integer.
Sum:
Product:
Subtract the sum and add the product.
The equation is:
Multiply the equation by :
Example Question #52 : Intermediate Single Variable Algebra
Write an equation with the given roots:
To write an equation, find the sum and product of the roots. The sum is the negative coefficient of , and the product is the integer.
Sum:
Product:
Subtract the sum and add the product.
The equation is:
Example Question #53 : Intermediate Single Variable Algebra
Write an equation with the given roots:
To write an equation, find the sum and product of the roots. The sum is the negative coefficient of , and the product is the integer.
Sum:
Product:
Subtract the sum and add the product.
The equation is:
Example Question #51 : Intermediate Single Variable Algebra
Write an equation with the given roots:
To write an equation, find the sum and product of the roots. The sum is the negative coefficient of , and the product is the integer.
Sum:
Product:
Subtract the sum and add the product.
The equation is:
Multiply the equation by :
Example Question #5 : Understanding Quadratic Roots
Write an equation with the given roots:
To write an equation, find the sum and product of the roots. The sum is the negative coefficient of , and the product is the integer.
Sum:
Product:
Subtract the sum and add the product.
The equation is:
Example Question #1 : Solving Quadratic Equations
Find the zeros.
Factor the equation to . Set both equal to zero and you get and . Remember, the zeros of an equation are wherever the function crosses the -axis.
Example Question #1 : Solving Quadratic Equations
Find the zeros.
Factor out an from the equation so that you have . Set and equal to . Your roots are and .
Example Question #3 : Solving Quadratic Equations
Find the zeros.
Set equal to zero and you get . Set equal to zero as well and you get and because when you take a square root, your answer will be positive and negative.