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Re: If 2^{20} = 2^{15}x+y, where x and y are non-negative integ [#permalink]
GreenlightTestPrep wrote:
GeminiHeat wrote:
If \(2^{20} = 2^{15}x+y,\) where x and y are non-negative integers, what is the minimum possible value of \(|x − y|\)?

(A) 0

(B) 1

(C) \(2^5\)

(D) \(2^{10}\)

(E) \(2^{15}\)


Take: \(2^{20} = 2^{15}x+y\)

Subtract \(2^{15}x\) from both sides to get: \(2^{20} - 2^{15}x=y\)

Factor: \(2^{15}(2^{5}- x)=y\)

Rewrite as: \(y=2^{15}(32- x)\)

Since x and y are non-negative integers, we can conclude that \(0<x≤32\) (i.e, if x > 32, y is negative)

Notice that, if \(x=1\), \(y=2^{15}(32- 1)=2^{15}(31)\), which is a little bit less than \(2^{20}\)
In other words, the maximum value of y is a little bit less than \(2^{20}\)

Also, if \(x=32\), \(y=2^{15}(32-32)=2^{15}(0)=0\)

So, the minimum value of y is \(0\) AND \(x=32\) is the maximum value of x

As such, the minimum value \(|x − y|\) is \(|32 − 0|=32=2^5\)

Answer: C

Cheers,
Brent


If x = 0 then y = 2^20, the value of |x-y| is going to an higher end and cannot be minimum.

The relation between x & y is inverse. Absolute classic explanation Brent.

In our language: it's a consummate explanation!! Thank you.
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Re: If 2^{20} = 2^{15}x+y, where x and y are non-negative integ [#permalink]
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