### All GMAT Math Resources

## Example Questions

### Example Question #11 : Solving Linear Equations With Two Unknowns

Solve the system of equations.

**Possible Answers:**

*x* = all real numbers,

*y* = all real numbers

**Correct answer:**

Let's first look at the 2nd equation. All three terms in can be divided by 7. Then We can isolate x to get

Now let's plug into the 1st equation,

Now let's plug our *y*-value into to solve for *y*:

So

### Example Question #1091 : Gmat Quantitative Reasoning

Choose the statement that most accurately describes the system of equations.

**Possible Answers:**

is positive, is negative.

is positive, is positive.

No unique solution.

is negative, is negative.

is negative, is positive.

**Correct answer:**

is positive, is negative.

Subtract the first equation from the second:

Now we can substitute this into either equation. We'll plug it into the first equation here:

Thus we get and .

Therefore is positive and is negative.

### Example Question #13 : Solving Linear Equations With Two Unknowns

If and ; what is the value of ?

**Possible Answers:**

**Correct answer:**

For this problem we can use the elimination method to solve for one of our variables. We do this my multiplying our first equation by -2.

From here we can combine this equation with our second equation given in the question and solve for x.

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Now we plug 1 back into our original equation and solve for y.

Therefore,

### Example Question #14 : Solving Linear Equations With Two Unknowns

Find the point of intersection of the two lines.

**Possible Answers:**

None of the other answers

**Correct answer:**

None of the other answers

The correct answer is

There are a few ways of solving this. The method I will use is the method of elimination.

(Start)

(Multiply the 2nd equation by -1 and add the result to the first equation, combining like terms. Now the top equation simplifies to

Now that we have one of the variables solved for, we can plug into either of the original equations, and we can get our , Let's use the 2nd equation.

Hence the point of intersection of the two lines is .

### Example Question #15 : Solving Linear Equations With Two Unknowns

Julie has coins, all dimes and quarters. The total value of all her coins is . How many dimes and quarters does Julie have?

**Possible Answers:**

quarters and dimes

quarters and dimes

quarters and dimes

quarters and dimes

quarters and dimes

**Correct answer:**

quarters and dimes

Let be the number of dimes Julie has and be the numbers of quarters she has. The number of dimes and the number of quarters add up to coins. The value of all quarters and dimes is . We can then write the following system of equations:

To use substitution to solve the problem, begin by rearranging the first equation so that is by itself on one side of the equals sign:

Then, we can replace in the second equation with :

Distribute the :

Subtract from each side of the equation:

Divide each side of the equation by :

Now, we can insert our value for into the first equation and solve for :

Julie has quarters and dimes.

### Example Question #16 : Solving Linear Equations With Two Unknowns

Solve the following system of linear equations:

**Possible Answers:**

**Correct answer:**

To solve a system of two equations with two unknowns, we first solve one of the equations for one of the variables and then substitute that value into the other equation. This allows us to find a solution for one of the variables, which we then plug back into either equation to find the solution for the other variable:

Substituting the right side of the rearranged equation into the other equation for , we get:

Now we can solve this equation for .

Now that we know the value of , we can plug that value into the other equation for and solve for :

### Example Question #17 : Solving Linear Equations With Two Unknowns

is a linear equation that passes through the points and . What is the slope , and y-intercept of ?

**Possible Answers:**

**Correct answer:**

We're told to find the slope and -intercept of a line that passes through the points and . To begin, calculate the slope using the following equation:

So now that we have our slope, we need to find our -intercept.

Recall the general form for a linear equation:

Rearrange to solve for and use our slope and one of the given points to solve:

So, we have our slope, and our -intercept, .

### Example Question #18 : Solving Linear Equations With Two Unknowns

Given and , find the values of and .

**Possible Answers:**

**Correct answer:**

We can solve this problem by setting up a system of equations and using elimination:

We can eliminate the and solve for by multiplying the bottom equation by and adding the equations:

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We can now find by substituting our into any equation:

### Example Question #19 : Solving Linear Equations With Two Unknowns

The product of two positive numbers, and , yields . If their sum is , what is the value of ?

**Possible Answers:**

**Correct answer:**

We have enough information to write out two equations:

Using the first equation, we can narrow our potential values to:.

Using the second equation, we can narrow down our values even further to **. *** *We are, however, being asked specifically for the value of . Since we cannot state if the ** **or the represents and which represents , we cannot answer this question. Additional data, such as is less than , would be required.

### Example Question #11 : Algebra

Solve for .

**Possible Answers:**

**Correct answer:**

We can solve this problem in the same way we would solve a system of equations using elimination. Since we are solving for we can manipulate the system to cancel out the values:

We then add the equations. Notice how the values cancel out

leaving us with