# How to show that Shift Left Logical multiplies by 2^n?

*I am new to Mips and study by myself so this question may be all wrong.

I read that Shift Right Logical divides the number by 2^n and I did the below to prove it.

``````srl \$t2,\$t1,1

\$t1:  10100111  :  167
\$t2:  01010011  :  83
``````

Also, I read that Shift Left Logical multiplies by 2^n. However I can not show this.

``````sll \$t2,\$t1,1

\$t1:  10100111  :  167
\$t2:  01001110  :  78
``````

What am I missing here?

-

I'm going to guess that you're operating on 8-bit types, so your left-shifted value overflows.

• (167 * 2) = 334

• 334 % 256 = 78

-
So is it true that sll multiplies 2^n ? –  Xalloumokkelos Jun 26 '12 at 18:02
@Kaoukkos Try a number smaller than 167 instead. To be exact, 127 or smaller. –  Alexey Frunze Jun 26 '12 at 19:55

You are throwing a bit away when you shift. The solution is really 101001110, but only 01001110 can be stored (according to the example).

So, normally yes, sll multiplies by n^2, if it fits in the registers.

-