If 4a + 4a+1 = 4a-2 -176, what is the value of a?
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Hi pythuy,
To start, when posting specific GMAT questions, you should make sure to post them in the proper sub-forum. For example, the Problem Solving Forum can be found here:
https://www.beatthegmat.com/problem-solving-f6.html
In addition, you should post the FULL prompt (including the 5 answers choices and the correct answer).
With this question, we're told that 4^A + 4^(A+1) = 4^(A+2) - 176. We're asked for the value of A. If we had the 5 answer choices, then we could TEST THE ANSWERS and find the number that properly "fits" the given equation. Even without that information though, solving this problem isn't too tough - we can use 'brute force' to do it.
Here are the first several 'powers of 4':
4^1 = 4
4^2 = 16
4^3 = 64
4^4 = 256
4^5 = 1024
Notice that as the exponent increases, the difference in the values between consecutive powers of 4 significantly increases. That's an important detail, since this question asks us to deal with 3 consecutive powers of 4 AND a difference of 176. Looking at that list of numbers, we can see a difference of 192 between 4^3 and 4^4, so that's a clue as to where we should be looking.
IF..... A = 2....
4^2 = 16, 4^3 = 64 and 4^4 = 256
Does 16 + 64 = 256 - 176?
80 = 80
This equation is correct, so A=2 must be the answer.
GMAT assassins aren't born, they're made,
Rich
To start, when posting specific GMAT questions, you should make sure to post them in the proper sub-forum. For example, the Problem Solving Forum can be found here:
https://www.beatthegmat.com/problem-solving-f6.html
In addition, you should post the FULL prompt (including the 5 answers choices and the correct answer).
With this question, we're told that 4^A + 4^(A+1) = 4^(A+2) - 176. We're asked for the value of A. If we had the 5 answer choices, then we could TEST THE ANSWERS and find the number that properly "fits" the given equation. Even without that information though, solving this problem isn't too tough - we can use 'brute force' to do it.
Here are the first several 'powers of 4':
4^1 = 4
4^2 = 16
4^3 = 64
4^4 = 256
4^5 = 1024
Notice that as the exponent increases, the difference in the values between consecutive powers of 4 significantly increases. That's an important detail, since this question asks us to deal with 3 consecutive powers of 4 AND a difference of 176. Looking at that list of numbers, we can see a difference of 192 between 4^3 and 4^4, so that's a clue as to where we should be looking.
IF..... A = 2....
4^2 = 16, 4^3 = 64 and 4^4 = 256
Does 16 + 64 = 256 - 176?
80 = 80
This equation is correct, so A=2 must be the answer.
GMAT assassins aren't born, they're made,
Rich