All Algebra II Resources
Example Questions
Example Question #174 : Solving Quadratic Equations
Use the quadratic formula to find the roots of the quadratic,
Recall the general form of a quadratic,
The solution set has the form,
For our particular case, , , and
Example Question #31 : Quadratic Formula
Use the quadratic formula to find the roots of the following equation.
First, simplify the equation, so that the numbers are easier to work with. We can see that we can factor a 2 from each term.
Now we can divide both sides by 2, to further simplify.
Now that we have simplified we can apply the quadratic formula.
where a, b, and c are the constants defined as follows:
This means our a is 1, our b is -6, and our c is 8.
Finally, lets plug the numbers into the formula:
and
or more simply:
These are the roots of the equation.
Example Question #176 : Solving Quadratic Equations
Find the roots of the equation using the quadratic equation.
where a, b, and c are the constants defined as follows:
This means our a is 1, our b is -6, and our c is 8.
Finally, lets plug the numbers into the formula:
These are the roots of the equation.
Remember that using is the exact same as writing:
Example Question #177 : Solving Quadratic Equations
Use the quadratic formula to find the answer of the following quadratic equation.
The quadratic equation is:
Therefore:
Which gives the answer:
Example Question #171 : Solving Quadratic Equations
Solve for x:
For a quadratic function
the quadratic formula states that
Using the formula for our function, we get
Notice that we have a negative under the square root. This means that we must use the imaginary number
and our roots will be imaginary.
Simplifying using i, we get
Example Question #179 : Solving Quadratic Equations
Find the roots using the quadratic formula
For this problem
a=1, the coefficient on the x^2 term
b=7, the coefficient on the x term
c=7, the constant term
Example Question #180 : Solving Quadratic Equations
Find a root for:
Write the quadratic equation that applies for .
There is no term. Substitute the known coefficients from the polynomial.
Simplify the numerator and denominator.
The roots will be imaginary.
One of the possible answers is:
Example Question #181 : Solving Quadratic Equations
Solve:
None of these
Solve using the Quadratic formula:
Since our quadratic is in standard form , just plug in the values from the equation.
Simplify within the radical:
Simplify the radical:
Divide both numerators by the denominator to simplify:
Example Question #331 : Quadratic Equations And Inequalities
Use the quadratic formula to determine a root:
Write the quadratic formula for polynomials in the form of
Substitute the known values.
Simplify the equation.
The roots to this parabola is:
The answer is .
Example Question #41 : Quadratic Formula
Find a root using the quadratic equation:
Write the quadratic equation.
Rewrite the given equation in form.
We can determine the coefficients of the terms.
Substitute these values into the quadratic equation.
Rewrite this fraction using common factors, and simplify each step.
One of the possible answers given is:
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