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Sub 505 (Easy)|   Exponents|      
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Bunuel
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5(2^12)/4^5 22 Jul 2020, 05:37
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

5% (low)

Question Stats:

91% (00:27) correct 9% (00:57) wrong based on 54 sessions

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Date
Time
Result
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\(\frac{5(2^{12})}{4^5}\)


A. 5

B. 10

C. 15

D. 20

E. 25
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D
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5(2^12)/4^5 22 Jul 2020, 05:39
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\(\frac{5(2^{12})}{4^5}\)

= \(\frac{5(4^{6})}{4^5}\)

= \(5*4\)

= 20

Hence, OA is (D).
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5(2^12)/4^5 22 Jul 2020, 05:59
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5(2^12)/4^5
Now, note that we can rewrite 4^5 as (2²)^5 which is equal to 2^10

The question now becomes 5(2^12)/2^10

This will then become 5(2^2)
Which is equal to 5(4)=20

Thus, the answer is option D i.e 20

Hope this helped!

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5(2^12)/4^5 22 Jul 2020, 06:04
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This question is about Simplifying Exponents
We have a power of two in numerator and a power of 4 in denominator which we need to cancel out to simply this exponent.
Let's simplify the denominator first to bring it in terms of power of 2

\(4^5\) = \((2^2)^5\) = \(2^{2*5}\) = \(2^{10}\)

=> \(\frac{5(2^{12})}{4^5}\) = \(\frac{5(2^{12})}{2^{10}}\)
Now, using the property "If two exponents with the same base are divided then their power gets subtracted"
i.e.\( \frac{x^a }{ x^b}\) = \(x^{(a-b)}\)
We can simplify by cancelling power of 2 now
\(\frac{5(2^{12})}{2^{10}}\) = \(5 * 2^{(12-10)}\)
= \(5 * 2^2\) = 5*4 = 20

So, answer will be D
Hope it helps!
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