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Example Questions
Example Question #44 : Quadratic Equations And Inequalities
Find the root(s) of the following quadratic polynomial.
We set the function equal to 0 and factor the equation. By FOIL, we can confirm that is equivalent to the given function. Thus, the only zero comes from, and . Thus, is the only root.
Example Question #45 : Quadratic Equations And Inequalities
Example Question #46 : Quadratic Equations And Inequalities
Solve the quadratic equation using any method:
Use the quadratic formula to solve:
Example Question #81 : Intermediate Single Variable Algebra
Solve the following equation using the quadratic form:
Factor and solve:
or
This has no solutions.
Therefore there is only one solution:
Example Question #21 : Solving Quadratic Equations
Solve the following equation using the quadratic form:
Factor and solve:
or
Therefore the equation has four solutions:
Example Question #83 : Intermediate Single Variable Algebra
Solve the following equation using the quadratic form:
Factor and solve:
or
Therefore the equation has two solutions.
Example Question #84 : Intermediate Single Variable Algebra
Solve the following equation using the quadratic form:
Factor and solve:
Each of these factors gives solutions to the equation:
Example Question #22 : Solving Quadratic Equations
The product of two consecutive positive numbers is . What is the sum of the two numbers?
Let the first number and the second number.
The equation to sovle becomes , or .
Factoring we get , so the solution is . The problem states that the numbers are positive, so the correct numbers are and , which sum to .
Example Question #332 : Algebra Ii
Two positive, consecutive odd numbers have a product of . What is their sum?
Let first odd number and second odd number. Then:
Use the distributive property and subtract from both sides to get .
Factoring we get .
Solving we get , so .
The problem stated that the numbers were positive so the answer becomes .
Example Question #333 : Algebra Ii
Find the sum of the solutions to:
Multiply both sides of the equation by , to get
This can be factored into the form
So we must solve
and
to get the solutions.
The solutions are:
and their sum is .
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