100a×1000b can be written in the form 10w.Show that w=2a+3b

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asked Apr 11, 2019 166k views

2 Answers

Spanky Quigman · Answer 1 · 2019-04-14T11:42:58+0000

100^a x 1000^b
=(10^2)^a x (10^3)^b
By the laws of exponents, (x^a)^b = x^ab
=(10^2a) x (10^3b)
Also, since x^a * x^b = x^(a+b)
=10^(2a+3b)
If this is in the form 10^w,
w = 2a+3b

Bryan Oakley · Answer 2 · 2019-04-15T09:35:14+0000

Answer:

It is proved that
w=2a+3b

Explanation:

It is given that
100^a* 1000^b can be written in the form
10^w

It means

100^a* 1000^b=10^w

(10^2)^a* (10^3)^b=10^w

$10^(2a)* {10^3b}=10^w$
$[\because (a^m)^n=a^(mn])$

10^(2a+3b)=10^w
$[\because a^m* a^n=a^(m+n)]$

Base is same on both the sides. On comparing the powers we get,

2a+3b=w

Hence proved.

100a×1000b can be written in the form 10w.Show that w=2a+3b

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