All GMAT Math Resources
Example Questions
Example Question #11 : Powers & Roots Of Numbers
What is ?
Example Question #12 : Powers & Roots Of Numbers
What is ?
Example Question #11 : Understanding Powers And Roots
What is ?
Example Question #12 : Understanding Powers And Roots
What is ?
Example Question #13 : Understanding Powers And Roots
What is ?
Example Question #14 : Understanding Powers And Roots
Which of the following is equivalent to ?
Example Question #15 : Understanding Powers And Roots
The two terms have the same base, 3. Therefore, we add the exponents to simplify:
Example Question #16 : Powers & Roots Of Numbers
Find the remainder
Clearly, we aren't expected to calculate 75^75. The clue is that since we are supposed to divide by 38, let's see if we can rewrite the numerator so that we have a 38 in it.
For example: ,
and ,
so we have:
If we expanded this expression, all of the terms but one will have a in them, so all of the terms except for the last term, when divided by , will not leave a remainder.
The last term will be , which is just .
Essentially, all we are asked to do is to figure out the remainder when is divided by .
Otherwise stated:
, where R is the remainder.
Clearly,
Example Question #1598 : Gmat Quantitative Reasoning
Give the area of the above kite.
The area cannot be determined from the information given.
,
so the lengths of the sides of each triangle comprise a Pythagorean triple. Therefore, each triangle is a right triangle with legs 7 and 24, and the kite is a composite of two such right triangles. Its area is therefore
Example Question #13 : Understanding Powers And Roots
Which of the following expressions is equivalent to ?
You may assume that is positive.
None of the other responses is correct.
For all integers and all positive bases ,
by definition.
Set :