All ISEE Middle Level Math Resources
Example Questions
Example Question #607 :Algebraic Concepts
Which of the following makes this equation true:
To answer the question, we will solve forx.
Example Question #608 :Algebraic Concepts
Solve foryin the following equation:
To solve, we wantyto stand alone. We get
Example Question #609 :Algebraic Concepts
Which of the following makes this equation true:
To answer the question, we will solve fors. So, we get
Example Question #610 :Algebraic Concepts
Solve forjin the following equation:
To solve forj, we wantjto stand alone. So, we get
Example Question #401 :How To Find The Solution To An Equation
Solve forhin the following equation:
To solve forh, we wanthto stand alone.
So, we get
Example Question #402 :How To Find The Solution To An Equation
Determine the solution to the following equation:
Group the x-terms on one side of the equation, and the integers on the other side.
Subtracton both sides.
Add 9 on both sides.
The answer is:
Example Question #403 :How To Find The Solution To An Equation
Which of the following makes this equation true:
To answer the question, we will solve forx. We get
Example Question #404 :How To Find The Solution To An Equation
Solve for.
To solve for, we must isolate the variable.
The first step is to add four to each side, so we are left with
.
Finally, divide each side by 2 and we are left with
.
Example Question #405 :How To Find The Solution To An Equation
Solve for.
To solve for, we must isolate the variable.
The first step is to subtract 5 from each side, so we are left with
.
Finally, divide each side by 3 and we are left with
.
Example Question #406 :How To Find The Solution To An Equation
Solve for.
To solve for, we must get the variable by itself.
The first step is to subtract 2 from both sides of the equation, so we are left with
.
Then we subtractfrom both sides of the equation, so we are left with
.
Finally, we divide each side by 2 and are left with
.
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