All Praxis Math Resources
Example Questions
Example Question #1 : Number And Quantity
is of which of the following numbers?
In order to solve this problem, we need to understand the relationship between percentages and ratios. Percents can be written as a value over a whole. In this case , our whole is one-hundred percent; therefore, we can write the following:
Now, we need to create a relationship between our known value and the number we need to calculate. In the problem, we know that is of another number we will name, . Using this information we need to construct a proportion. We can write the following proportion:
We can cross multiply and solve for the unknown variable.
Rewrite.
Simplify.
Divide both sides of the equation by .
Solve.
Example Question #1 : Ratios And Proportional Relationships
is of which of the following numbers?
In order to solve this problem, we need to understand the relationship between percentages and ratios. Percents can be written as a value over a whole. In this case , our whole is one-hundred percent; therefore, we can write the following:
Now, we need to create a relationship between our known value and the number we need to calculate. In the problem, we know that is of another number we will name, . Using this information we need to construct a proportion. We can write the following proportion:
We can cross multiply and solve for the unknown variable.
Rewrite.
Simplify.
Divide both sides of the equation by .
Solve.
Example Question #3 : Number And Quantity
Calculate of .
In order to solve this problem, we need to understand the relationship between percentages and ratios. Percents can be written as a value over a whole. In this case , our whole is one-hundred percent; therefore, we can write the following:
Now, we need to create a relationship between our known value and the number we need to calculate. In the problem, we know that ore whole number is and we need to calculate of this number. We will name this variable, . Using this information we need to construct a proportion. We can write the following proportion:
We can cross multiply and solve for the unknown variable.
Rewrite.
Simplify.
Divide both sides of the equation by .
Solve.
Example Question #2 : Number And Quantity
Calculate of .
In order to solve this problem, we need to understand the relationship between percentages and ratios. Percents can be written as a value over a whole. In this case , our whole is one-hundred percent; therefore, we can write the following:
Now, we need to create a relationship between our known value and the number we need to calculate. In the problem, we know that ore whole number is and we need to calculate of this number. We will name this variable, . Using this information we need to construct a proportion. We can write the following proportion:
We can cross multiply and solve for the unknown variable.
Rewrite.
Simplify.
Divide both sides of the equation by .
Solve.
Example Question #3 : Number And Quantity
Solve:
Cannot be determined
In order to divide a fraction by a second fraction, we can change the problem to a division problem by multiplying the first fraction by the reciprocal of the second fraction. It can be written algebraically in the following way:
Let's use this rule to solve our problem.
Rewrite.
Solve.
Convert to a mixed number.
Example Question #4 : Number And Quantity
Solve:
In order to divide a fraction by a second fraction, we can change the problem to a division problem by multiplying the first fraction by the reciprocal of the second fraction. It can be written algebraically in the following way:
Let's use this rule to solve our problem.
Rewrite.
Cross out like terms.
Solve.
Example Question #5 : Number And Quantity
Solve:
In order to divide a fraction by a second fraction, we can change the problem to a division problem by multiplying the first fraction by the reciprocal of the second fraction. It can be written algebraically in the following way:
Let's use this rule to solve our problem.
Rewrite.
Cross out like terms.
Solve.
Example Question #1 : Praxis Core Skills: Math
Solve for .
Cannot be determined
In order to solve for the variable, , we need to isolate it on the left side of the equation. We will do this by reversing the operations done to the variable by performing the opposite of each operation on both sides of the equation.
Let's begin by rewriting the given equation.
Subtract from both sides of the equation.
Simplify.
Divide both sides of the equation by .
Solve.
Example Question #2 : Praxis Core Skills: Math
Solve for .
Cannot be determined
In order to solve for the variable, , we need to isolate it on the left side of the equation. We will do this by reversing the operations done to the variable by performing the opposite of each operation on both sides of the equation.
Let's begin by rewriting the given equation.
Subtract from both sides of the equation.
Simplify.
Divide both sides of the equation by .
Solve.
Example Question #3 : Praxis Core Skills: Math
Solve for .
Cannot be determined
In order to solve for the variable, , we need to isolate it on the left side of the equation. We will do this by reversing the operations done to the variable by performing the opposite of each operation on both sides of the equation.
Let's begin by rewriting the given equation.
Add to both sides of the equation.
Simplify.
Divide both sides of the equation by .
Solve.