GMAT Math : Problem-Solving Questions

Study concepts, example questions & explanations for GMAT Math

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Example Questions

Example Question #621 : Gmat Quantitative Reasoning

Given:  with 

Construct two altitudes of : one from  to a point  on , and the other from  to a point  on . Give the ratio of the length of  to that of .

Possible Answers:

Correct answer:

Explanation:

 is shown below, along with altitudes  and ; note that  has been extended to a ray  to facilitate the location of the point 

Isosceles_3

For the sake of simplicity, we will call the measure of  1; the ratio is the same regarless of the actual measure, and the measure of  willl give us the desired ratio. 

Since , and , by definition, is perpendicular to  is a 30-60-90 triangle. By the 30-60-90 Theorem, hypotenuse  of  has length twice that of short leg , so .

Since an exterior angle of a triangle has as its measure the sum of those of its remote interior angles, 

.

By defintiion of an altitude,  is perpendicular to , making  a 30-60-90 triangle. By the 30-60-90 Theorem, shorter leg  of  has half the length of hypotenuse , so ; also, longer leg  has length  times this, or .

The correct choice is therefore that the ratio of the lengths is .

 

Example Question #10 : Calculating The Height Of An Acute / Obtuse Triangle

Given:  with  and .

Construct the altitude of  from  to a point  on . What is the length of ?

Possible Answers:

Correct answer:

Explanation:

 is shown below, along with altitude ; note that  has been extended to a ray  to facilitate the location of the point 

Isosceles_2

Since an exterior angle of a triangle has as its measure the sum of those of its remote interior angles, 

By definition of an altitude,  is perpendicular to , making  a right triangle and  a 30-60-90 triangle. By the 30-60-90 Triangle Theorem, shorter leg  of  has half the length of hypotenuse —that is, half of 48, or 24; longer leg  has length  times this, or , which is the correct choice.

Example Question #11 : Calculating The Height Of An Acute / Obtuse Triangle

Given:  with  and .

Construct the altitude of  from  to a point  on . What is the length of ?

Possible Answers:

Correct answer:

Explanation:

 is shown below, along with altitude .

Isosceles

Since , and , by definition, is perpendicular to  is a 30-60-90 triangle. By the 30-60-90 Triangle Theorem, , as the shorter leg of , has half the length of hypotenuse ; this is half of 30, or 15.

Example Question #12 : Calculating The Height Of An Acute / Obtuse Triangle

Given:  with , construct two  altitudes of : one from  to a point  on , and another from  to a point  on . Which of the following is true of the relationship of the lengths of  and ?

Possible Answers:

The length of  is nine-sixteenths that of 

The length of  is two-thirds that of 

The length of  is four-ninths that of 

The length of  is twice that of 

The length of  is three-fourths that of 

Correct answer:

The length of  is three-fourths that of 

Explanation:

The area of a triangle is one half the product of the length of any base and its corresponding height; this is , but it is also . Set these equal, and note the following:

That is, the length of  is three fourths that of that of 

Example Question #381 : Geometry

Find the equation of the line that is perpendicular to the line connecting the points \dpi{100} \small (0,-4)\ and\ (-1,-7).

Possible Answers:

\dpi{100} \small y=\frac{x}{3}+1

\dpi{100} \small y=-4x+8

\dpi{100} \small y=3x-1

the line between points \dpi{100} \small (0,0)\ and\ (2,2)

the line between the points \dpi{100} \small (3,0)\ and\ (-3,2)

Correct answer:

the line between the points \dpi{100} \small (3,0)\ and\ (-3,2)

Explanation:

Lines are perpendicular if their slopes are negative reciprocals of each other. First we need to find the slope of the line in the question stem.

slope = \frac{rise}{run} = \frac{y_{2} - y_{1}}{x_{2} - x_{1}} = \frac{-7 + 4}{-1 - 0} = \frac{-3}{-1} = 3

The negative reciprocal of 3 is \dpi{100} \small -\frac{1}{3}, so our answer will have a slope of \dpi{100} \small -\frac{1}{3}. Let's go through the answer choices and see.

\dpi{100} \small y=3x-1: This line is of the form \dpi{100} \small y=mx+b, where \dpi{100} \small m is the slope. The slope is 3, so this line is parallel, not perpendicular, to our line in question.

\dpi{100} \small y=-4x+8: The slope here is \dpi{100} \small -4, also wrong.

\dpi{100} \small y=\frac{x}{3}+1: The slope of this line is \dpi{100} \small \frac{1}{3}. This is the reciprocal, but not the negative reciprocal, so this is also incorrect.

The line between the points \dpi{100} \small (3,0)\ and\ (-3,2):\dpi{100} \small slope = \frac{2}{(-3-3)}=\frac{2}{-6}=-\frac{1}{3}.

This is the correct answer! Let's check the last answer choice as well.

The line between points \dpi{100} \small (0,0)\ and\ (2,2):\dpi{100} \small slope = \frac{2}{2}=1, which is incorrect.

Example Question #382 : Geometry

Determine whether the lines with equations  and  are perpendicular.

Possible Answers:

They are perpendicular

There is not enough information to determine the answer

They are not perpendicular

Correct answer:

They are not perpendicular

Explanation:

If two equations are perpendicular, then they will have inverse negative slopes of each other.  So if we compare the slopes of the two equations, then we can find the answer.  For the first equation we have  

so the slope is 

So for the equations to be perpendicular, the other equation needs to have a slope of 3.  For the second equation, we have 

 

so the slope is 

Since the slope of the second equation is not equal to 3, then the lines are not perpendicular.

Example Question #383 : Geometry

Transversal

Refer to the above figure. . True or false: 

Statement 1: 

Statement 2:  and  are supplementary.

Possible Answers:

BOTH statements TOGETHER are sufficient to answer the question, but NEITHER statement ALONE is sufficient to answer the question.

Statement 2 ALONE is sufficient to answer the question, but Statement 1 ALONE is NOT sufficient to answer the question.

Statement 1 ALONE is sufficient to answer the question, but Statement 2 ALONE is NOT sufficient to answer the question.

EITHER statement ALONE is sufficient to answer the question.

BOTH statements TOGETHER are insufficient to answer the question. 

Correct answer:

EITHER statement ALONE is sufficient to answer the question.

Explanation:

If transversal  crosses two parallel lines  and , then same-side interior angles are supplementary, so  and  are supplementary angles. Also, corresponding angles are congruent, so .

By Statement 1 alone, angles  and  are congruent as well as supplementary; by Statement 2 alone,  and  are also supplementary as well as congruent. Two angles that are both supplementary and congruent are both right angles, so from either statement alone,  and  intersect at right angles, so, consequently, .

Example Question #2 : Calculating Whether Lines Are Perpendicular

Transversal

Figure NOT drawn to scale.

Refer to the above figure.

True or false: 

Statement 1:  is a right angle.

Statement 2:  and  are supplementary.

Possible Answers:

BOTH statements TOGETHER are sufficient to answer the question, but NEITHER statement ALONE is sufficient to answer the question.

Statement 1 ALONE is sufficient to answer the question, but Statement 2 ALONE is NOT sufficient to answer the question.

Statement 2 ALONE is sufficient to answer the question, but Statement 1 ALONE is NOT sufficient to answer the question.

EITHER statement ALONE is sufficient to answer the question.

BOTH statements TOGETHER are insufficient to answer the question. 

Correct answer:

BOTH statements TOGETHER are sufficient to answer the question, but NEITHER statement ALONE is sufficient to answer the question.

Explanation:

Statement 1 alone establishes by definition that , but does not establish any relationship between  and .

By Statement 2 alone, since same-side interior angles are supplementary, , but no conclusion can be drawn about the relationship of , since the actual measures of the angles are not given.

Assume both statements are true. If two lines are parallel, then any line in their plane perpendicular to one must be perpendicular to the other.  and , so it can be established that .

Example Question #1 : Calculating Whether Lines Are Perpendicular

Find the equation of the line that is perpendicular to the following equation and passes through the point .

Possible Answers:

Correct answer:

Explanation:

To solve this equation, we want to begin by recalling how to find the slope of a perpendicular line. In this case, our original line is modeled by the following:

To find the slope of any line perpendicular to the above equation, we simply need to take the reciprocal of the first slope, and then change its sign. Our original slope is , so

becomes

.

If we flip , we get , and the opposite sign of a negative is a positive; hence, our slope is positive .

So, we know our perpendicular line should look something like this:

However, we need to find out what  (our -intercept) is in order to complete our equation. To do so, we need to plug in the ordered pair we received in the question, , and solve for :

So, by putting everything together, we get our final equation:

This equation satisfies the conditions of being perpendicular to our initial equation and passing through .

Example Question #2 : Lines

Which of the following lines is perpendicular to ?

Possible Answers:

Two of the equations are perpendicular to the given line.

Correct answer:

Explanation:

In order for a line  to be perpendicular to another line  defined by the equation  , the slope of line  must be a negative reciprocal of the slope of line . Since line 's slope is  in the slope-intercept equation above, line 's slope would therefore be .

 

In this instance, , so . Therefore, the correct solution is .

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