All Algebra II Resources
Example Questions
Example Question #44 : Quadratic Formula
Solve the following equation:
Let . Then the given equation can be rewritten in terms of as follows:
.
By the quadratic formula,
Since , we now have and , which implies that and . Substituting each of these values yields a true statement; hence, the solutions to the original equation are
.
Example Question #45 : Quadratic Formula
Solve for the roots:
Write the quadratic formula.
The given equation is in standard form of:
The coefficients correspond to the values that go inside the quadratic equation.
Substitute the values into the equation.
Simplify this equation.
The radical can be rewritten as:
Substitute and simplify the fraction.
The answer is:
Example Question #46 : Quadratic Formula
Solve for the roots, if any:
This polynomial is in the standard form of a parabola, .
Write the quadratic formula.
Identify the variables.
Simplify the quadratic.
Split the fraction.
The answer is:
Example Question #501 : Intermediate Single Variable Algebra
Determine the roots, if possible:
Write the quadratic equation.
This equation will apply for polynomials in format.
Substitute the correct values into the quadratic formula.
Simplify this equation.
The answer is:
Example Question #48 : Quadratic Formula
A ball is launched straight up from the ground at time , and the height of the ball from the ground at time is described by the function . Find the time at which the ball returns to the ground.
In order to solve this problem, we think about how to translate what is asked of us in the problem into a mathematical notion. The problem asks us to find when the ball returns to the ground. We know that the ball is launched from the ground at time , and if we plug into our original function, we will find that at time , . Therefore, our "ground" is located at , which is also the horizontal axis. This means that if we are looking for when our ball returns to the ground, mathematically we are looking for values of which make . In other words, we are looking for the zeros (or horizontal intercepts) of our function.
Typically, the easiest way to find zeros is to factor, but in this situation factoring won't get us very far. So, we have to turn the quadratic formula. Remember for a function f(x) in the standard quadratic form, , you can find the zeros by plugging them into the quadratic formula, which is...
.
The first step in using the quadratic formula is to identify the proper , , and . In our case, and , while . So, to solve for our zeros, we simply need to plug these numbers into the quadratic formula and solve for x.
Since we know that is when our ball was launched, we know that must be when our ball returns to the ground.
Example Question #502 : Intermediate Single Variable Algebra
Find the zeros of the function f(x) where
Typically, the easiest way to find the zeros of a function is to factor. However, with this quadratic, which may not be particularly easy to factor by hand, quadratic formula may be easier. Recall that for a polynomial in the standard quadratic form, , the quadratic formula will give you all real zeros of the polynomial. First, we need to identify what , , and are in our original function. In this case, , , and . Next, we need to set up the quadratic formula, plug in our values, and solve.
Now we have our zeros!
Example Question #50 : Quadratic Formula
Determine a root:
Identify the coefficients given the equation in standard form:
Write the quadratic formula.
Substitute the coefficients.
These two roots are complex and either is a valid answer.
The answer is:
Example Question #191 : Solving Quadratic Equations
Determine a possible root for:
Write the quadratic formula.
Identify and substitute the terms.
Factor the radical using factors of perfect squares.
These two answers are possible roots.
The answer is:
Example Question #511 : Intermediate Single Variable Algebra
Find the roots of the quadratic function,
Where is any real number constant not equal to zero.
To find the roots set the function to zero:
,
(1)
Apply the quadratic formula:
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Reminder
Recall that for a quadratic the general formula for the solution in terms of the constant coefficients is given by:
(2)
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Use equation (2) to write a solution for equation (1).
If we simplify the right-hand term in the numerator we obtain:
So now we have for ,
After all the cancellations in the expression above we obtain:
Therefore, the solution set for this equation is:
Example Question #193 : Solving Quadratic Equations
Find the roots of the quadratic function,
The roots are the values of for which:
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Reminder
Recall that for a quadratic the general formula for the solution in terms of the constant coefficients is given by:
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Use the quadratic formula to find the roots.
Notice that is not a real number, and therefore the roots will be complex numbers.
Using the definition of the imaginary unit we can rewrite as follows,
Now we can write the solutions to this problem in the form:
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