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Updated on: 10 May 2020, 10:59
Originally posted by GMATBusters on 09 May 2020, 18:53.
Last edited by GMATBusters on 10 May 2020, 10:59, edited 2 times in total.
Last edited by GMATBusters on 10 May 2020, 10:59, edited 2 times in total.
Renamed the topic and edited the question.
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
(hard)
Question Stats:
23% (01:03) correct
77%
(01:22)
wrong
based on 47
sessions
History
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GMATBusters’ Quant Quiz Question -2
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If \(x^a*x^b = x^c,\) is what is \(\frac{c}{(a+b)}\)?
(1) a, b are integers
(2) a, and b are positive numbers
09 May 2020, 18:55
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Official Solution:
if a+b = c, then \(x^a*x^b = x^c\)
but vice versa is tricky.
but vice versa is tricky.
- if x = 1 or 0, then we can have \(x^a*x^b = x^d\), where d is any number
- similarly, if x = -1, x^n will always = 1 , if n is even
- hence if, \(x^a*x^b = x^c\). it is not necessary that c = a+b
If \(x^a*x^b = x^c,\) is what is \(\frac{c}{(a+b)}\)?
(1) a, b are integers
if x \(\neq{0}\) 1, 0, -1. then we can say c=a+b, but
if x = 1, 0, -1. then we can't say c=a+b
Not Sufficient
(2) a, and b are positive numbers
if x \(\neq{0}\) 1, 0, -1. then we can say c=a+b, but
if x = 1, 0, -1. then we can't say c=a+b
Not Sufficient
Even after combining both statements 1 & 2, we can find value of \(\frac{c}{(a+b)}\)
Hence, Answer is E
If x^a∗x^b=x^c, is what is c/(a+b)?
We need unique value of c/a+b.
x^a∗x^b=x^c
x^a+b=x^c
a+b =c
1) a, b are integers
If a = 2 and b = 3, then c = 5. So, 5/5 = 1
If a = 5, b = 7, then c = 12, So, 12/12=1
If a = -1, b = 2, then c = 1, 1/1= 1.
Sufficient.
2) a, and b are positive numbers
If a = 2 and b = 3, then c = 5. So, 5/5 = 1
If a = 1/2, b = 2, then c=2.5 (5/2), so 5/2 divided by 5/2 = 1
If a = 3/2, b = 2/3, then c=13/6, so 13/6 divided by 13/6 = 1
So sufficient.
Ans. D
We need unique value of c/a+b.
x^a∗x^b=x^c
x^a+b=x^c
a+b =c
1) a, b are integers
If a = 2 and b = 3, then c = 5. So, 5/5 = 1
If a = 5, b = 7, then c = 12, So, 12/12=1
If a = -1, b = 2, then c = 1, 1/1= 1.
Sufficient.
2) a, and b are positive numbers
If a = 2 and b = 3, then c = 5. So, 5/5 = 1
If a = 1/2, b = 2, then c=2.5 (5/2), so 5/2 divided by 5/2 = 1
If a = 3/2, b = 2/3, then c=13/6, so 13/6 divided by 13/6 = 1
So sufficient.
Ans. D
