All Algebra II Resources
Example Questions
Example Question #131 : Understanding Quadratic Equations
What is the discriminant?
The equation is already in the standard form of , where the discriminant is defined as:
Following the coefficients of each term with the polynomial in standard form, we can determine the values of each variable.
Substitute the terms into the equation.
The answer is:
Example Question #132 : Understanding Quadratic Equations
Identify the discriminant of the parabola given the roots:
We will need to use the roots to write the quadratic equation.
Simplify by using the FOIL method.
The discriminant of the parabola in standard form is defined as:
where .
Substitute the values in the equation.
The answer is:
Example Question #1434 : Algebra Ii
Evaluate the discriminant:
The given equation is not fully simplified in standard form:
Distribute the negative three across each term in the parentheses.
Write the formula for the discriminant.
Substitute the known terms.
The answer is:
Example Question #133 : Understanding Quadratic Equations
Identify the discriminant:
The equation is already in standard form .
Following the coefficients:
The discriminant is the term inside the square root of the quadratic equation.
Substitute the values.
The discriminant is:
Example Question #1436 : Algebra Ii
Determine the discriminant if the parabola has as roots.
Given the roots, we can set up the binomials of the parabola.
Use the FOIL method to simplify these binomials.
Simplify all the terms by distribution.
The equation of the parabola in standard form is:
The equation of the discriminant is the square root of the term under the radical of the quadratic equation. Substitute the terms into the equation.
The answer is:
Example Question #134 : Understanding Quadratic Equations
Determine the discriminant of the parabola:
Write the formula for the discriminant. This is the term inside the radical of the quadratic equation.
Substitute the values into the equation.
The answer is:
Example Question #135 : Understanding Quadratic Equations
Determine the discriminant of the following function:
The equation is already in standard form:
Identify the coefficients.
The formula for the discriminant is:
Substitute the values into the equation.
The answer is:
Example Question #41 : Discriminants
Determine the discriminant:
Write the formula for the discriminant. The discriminant is the term inside the square root portion of the quadratic formula.
Substitute the known coefficients of the polynomial in standard form:
The answer is:
Example Question #1440 : Algebra Ii
For the given polynomial function , find the relationship between and so that the function will have:
a) Two non-zero real roots
b) One non-zero real root
c) Two Complex Roots
Where the constants and can be any non-zero, positive real number.
a)
b)
c)
a)
b)
c)
a)
b)
c)
a)
b)
c)
a)
b)
c)
a)
b)
c)
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If we were to find the roots of this equation we would first set and attempt to factor:
The trivial solution is , the other possible non-zero solutions will depend on the quadratic factor. A quadratic equation may have either 2 complex roots, 2 real roots, or 1 real root. The conditions determined by a the radical term in the quadratic equation...the discriminate:
For a quadratic equation, or quadratic factor, of the form the discriminate is defined as:
For the quadratic factor in this problem we have,
The discriminate in this case is then,
Now let's recall how the discriminate determines the number and types of roots
a) Two Real Roots
When the discriminate is greater than zero the function has 2 real-valued roots.
b) One Real Root
When the discriminate is zero, the function has 1 real valued root:
Apply to the discriminate and solve for .
c) Two Complex Roots
Similarly, for two complex roots solve , we have:
Summary
a)
b)
c)
Example Question #1441 : Algebra Ii
Suppose the equation above has , and such that . Select which statement must be true about the solutions.
There is one real solution and one complex solution.
There are two complex solutions.
There are two real solutions.
There are no solutions.
There is one real solution.
There is one real solution.
(1)
(2)
The first step is conceptualize. What kind of equation is equation (1)? If we rearrange it's clearly a quadratic equation.
(3)
To determine the number of solutions use the discriminate:
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Reminder
Recall that for a quadratic equation the general formula for the solution in terms of the constant coefficients is given by:
The quantity under the radical is known as the discriminate. If the discriminate is less than zero, there are two complex valued solution. In cases where the discriminate is zero, there is just one real solution . If the discriminate is positive, then there are two real solutions.
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The discriminate for equation (3) is written:
We are given that . Therefore we have:
The discriminate is therefore zero, meaning there is only one real solution.