Discriminants - Algebra 2
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Find the discriminant for the quadratic equation 
Find the discriminant for the quadratic equation
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The discriminant is found using the formula 
. In this case:
The discriminant is found using the formula
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Find the discriminant for the quadratic equation 
Find the discriminant for the quadratic equation
Tap to reveal answer
To find the discriminant, use the formula 
. In this case:
To find the discriminant, use the formula
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Determine the number of real roots the given function has:
Determine the number of real roots the given function has:
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To determine the amount of roots a given quadratic function has, we must find the discriminant, which for
is equal to
If d is negative, then we have two roots that are complex conjugates of one another. If d is positive, than we have two real roots, and if d is equal to zero, then we have only one real root.
Using our function and the formula above, we get
Thus, the function has only one real root.
To determine the amount of roots a given quadratic function has, we must find the discriminant, which for
is equal to
If d is negative, then we have two roots that are complex conjugates of one another. If d is positive, than we have two real roots, and if d is equal to zero, then we have only one real root.
Using our function and the formula above, we get
Thus, the function has only one real root.
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Determine the discriminant for: 
Determine the discriminant for:
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Identify the coefficients for the polynomial 
.
Write the expression for the discriminant. This is the expression inside the square root from the quadratic formula.
Substitute the numbers.
The answer is: 
Identify the coefficients for the polynomial
Write the expression for the discriminant. This is the expression inside the square root from the quadratic formula.
Substitute the numbers.
The answer is:
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Given 
, what is the value of the discriminant?
Given
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In general, the discriminant is 
.
In this particual case 
.
Plug in these three values and simplify: 
In general, the discriminant is
In this particual case
Plug in these three values and simplify:
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Find the value of the discriminant and state the number of real and imaginary solutions.
Find the value of the discriminant and state the number of real and imaginary solutions.
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Given the quadratic equation of 
The formula for the discriminant is 
(remember this as a part of the quadratic formula?)
Plugging in values to the discriminant equation:
So the discriminant is 57. What does that mean for our solutions? Since it is a positive number, we know that we will have 2 real solutions. So the answer is:
57, 2 real solutions
Given the quadratic equation of
The formula for the discriminant is
Plugging in values to the discriminant equation:
So the discriminant is 57. What does that mean for our solutions? Since it is a positive number, we know that we will have 2 real solutions. So the answer is:
57, 2 real solutions
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Find the discriminant for the quadratic equation 
Find the discriminant for the quadratic equation
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The discriminant is found by using the formula 
. In this case:
The discriminant is found by using the formula
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Find the discriminant, 
, in the following quadratic expression:
Find the discriminant,
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Remember the quadratic formula:
.
The discriminant in the quadratic formula is the term that appears under the square root symbol. It tells us about the nature of the roots.
So, to find the discriminant, all we need to do is compute 
for our equation, where 
.
We get 
.
Remember the quadratic formula:
The discriminant in the quadratic formula is the term that appears under the square root symbol. It tells us about the nature of the roots.
So, to find the discriminant, all we need to do is compute
We get
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What is the discriminant of the following quadratic equation? Are its roots real?
What is the discriminant of the following quadratic equation? Are its roots real?
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The "discriminant" is the name given to the expression that appears under the square root (radical) sign in the quadratic formula, 
where 
, 
, and 
are the numbers in the general form of a quadratic trinomial: 
. If the discriminant is positive, the equation has real roots, and if it is negative, we have imaginary roots. In this case, 
, 
, and 
, so the discriminant is 
, and because it is negative, this equation's roots are not real.
The "discriminant" is the name given to the expression that appears under the square root (radical) sign in the quadratic formula,
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Determine the discriminant of the following quadratic equation 
.
Determine the discriminant of the following quadratic equation
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The discriminant is found using the equation 
. So for the function 
, 
,
, and 
. Therefore the equation becomes 
.
The discriminant is found using the equation
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Choose the answer that is the most correct out of the following options.
How many solutions does the function 
have?
Choose the answer that is the most correct out of the following options.
How many solutions does the function
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The number of roots can be found by looking at the discriminant. The discriminant is determined by 
. For this function, 
,
, and 
. Therfore, 
. When the discriminant is positive, there are two real solutions to the function.
The number of roots can be found by looking at the discriminant. The discriminant is determined by
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What is the discriminant for the function 
?
What is the discriminant for the function
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Given that quadratics can be written as 
. The discriminant can be found by looking at 
or the value under the radical of the quadratic formula. Using substiution and order of operations we can find this value of the discriminant of this quadratic equation.
Given that quadratics can be written as
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How many solutions does the quadratic 
have?
How many solutions does the quadratic
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The discrimiant will determine how many solutions a quadratic has. If the discriminant is positive, then there are two real solutions. If it is negative then there are two immaginary solutions. If it is equal to zero then there is one repeated solution.
Given that quadratics can be written as . The discriminant can be found by looking at or the value under the radical of the quadratic formula. Using substiution and order of operations we can find this value of the discriminant of this quadratic equation.
The discriminant is positive; therefore, there are two real solutions to this quadratic.
The discrimiant will determine how many solutions a quadratic has. If the discriminant is positive, then there are two real solutions. If it is negative then there are two immaginary solutions. If it is equal to zero then there is one repeated solution.
Given that quadratics can be written as
The discriminant is positive; therefore, there are two real solutions to this quadratic.
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Given 
, what is the value of the discriminant?
Given
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The correct answer is 
. The discriminant is equal to 
portion of the quadratic formula. In this case, "
" corresponds to the coefficient of 
, "
" corresponds to the coefficient of 
, and "
" corresponds to 
. So, the answer is 
, which is equal to 
.
The correct answer is
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How many real roots are there to the following equation:
How many real roots are there to the following equation:
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This is using the discriminant to find roots. The discriminant as you recall is
If you get a negative number you have no real roots, if you get zero you have one, and if you get a positive number you have two real roots.
So plug in your numbers:
Because you get a negative number you have zero real roots.
If you get a negative number you have no real roots, if you get zero you have one, and if you get a positive number you have two real roots.
So plug in your numbers:
Because you get a negative number you have zero real roots.
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Use the discriminant to determine the number of unique zeros for the quadratic:
Use the discriminant to determine the number of unique zeros for the quadratic:
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The discriminant is part of the quadratic formula. In the quadratic formula,
The discriminant is the term:
If the discriminant is 0, there is only one real solution. This would be:
, since the our discriminant is gone.
If the discriminant is a positive number, then we have two real roots, the usual form of the quadratic equation:
Finally, if the discriminant is negative, we would be taking the square root of a negative number. This will give us no real zeros.
Plugging the numbers into the discriminant gives us:
The discriminant is zero, so there is only one root,
The discriminant is part of the quadratic formula. In the quadratic formula,
The discriminant is the term:
If the discriminant is 0, there is only one real solution. This would be:
If the discriminant is a positive number, then we have two real roots, the usual form of the quadratic equation:
Finally, if the discriminant is negative, we would be taking the square root of a negative number. This will give us no real zeros.
Plugging the numbers into the discriminant gives us:
The discriminant is zero, so there is only one root,
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Find the discriminant of the following quadratic equation:
Find the discriminant of the following quadratic equation:
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The discriminant is found using the following formula:
For the particular function in question the variable are as follows.
Therefore:
The discriminant is found using the following formula:
For the particular function in question the variable are as follows.
Therefore:
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Use the discriminant to determine the number of real roots the function has:
Use the discriminant to determine the number of real roots the function has:
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Using the discriminant, which for a polynomial
is equal to
,
we can determine the number of roots a polynomial has. If the discriminant is positive, then the polynomial has two real roots. If it is equal to zero, the polynomial has one real root. If it is negative, then the polynomial has two roots which are complex conjugates of one another.
For our function, we have
,
so when we plug these into the discriminant formula, we get
So, our polynomial has two real roots.
Using the discriminant, which for a polynomial
is equal to
we can determine the number of roots a polynomial has. If the discriminant is positive, then the polynomial has two real roots. If it is equal to zero, the polynomial has one real root. If it is negative, then the polynomial has two roots which are complex conjugates of one another.
For our function, we have
so when we plug these into the discriminant formula, we get
So, our polynomial has two real roots.
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What is the discriminant of 
?
What is the discriminant of
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Write the formula for the discriminant. This is the term inside the square root of the quadratic formula.
The given equation is already in the form of 
.
Substitute the terms into the formula.
The answer is: 
Write the formula for the discriminant. This is the term inside the square root of the quadratic formula.
The given equation is already in the form of
Substitute the terms into the formula.
The answer is:
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Determine the discriminant of the following parabola: 
Determine the discriminant of the following parabola:
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The polynomial is written in the form 
, where
Write the formula for the discriminant. This is the term inside the square root value of the quadratic equation.
Substitute all the knowns into this equation.
The answer is: 
The polynomial is written in the form
Write the formula for the discriminant. This is the term inside the square root value of the quadratic equation.
Substitute all the knowns into this equation.
The answer is:
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