How does the graph of g(x) = 0.25 ⌊x⌋ differ from the graph of f(x)=⌊x⌋?

A. Multiplying by 0.25 shifts the graph of g(x)=0.25⌊x⌋ up 0.25 unit.

B. Multiplying by 0.25 shifts the graph of g(x)=0.25⌊x⌋ right 0.25 unit.

C. Multiplying by 0.25 shifts the graph of g(x)=0.25⌊x⌋ down 0.25 unit.

D. Multiplying by 0.25 compresses the graph of g(x)=0.25⌊x⌋ vertically by a factor of 0.25.

Question

How does the graph of g(x) = 0.25 ⌊x⌋ differ from the graph of f(x)=⌊x⌋?

A. Multiplying by 0.25 shifts the graph of ​ g(x)=0.25⌊x⌋ ​ ​up 0.25 unit.

B. Multiplying by 0.25 shifts the graph of ​ g(x)=0.25⌊x⌋ ​ right 0.25 unit.

C. Multiplying by 0.25 shifts the graph of ​ g(x)=0.25⌊x⌋ ​down 0.25 unit.

D. Multiplying by 0.25 compresses the graph of ​ ​ g(x)=0.25⌊x⌋ ​ vertically by a factor of 0.25.

Vocaloid · Answer

hint: multiplying on the outside of the  ⌊⌋ symbols (forgot what these are called) would be a vertical dilation/compression

Vocaloid · Answer

inside would be a horizontal dilation/compression

so what do you think the answer might be?

mikewwe13 · Answer

B.

Vocaloid · Answer

please pay attention to what I have said so far.

mikewwe13 · Answer

D.

Vocaloid · Answer

$\color{#0cbb34}{\text{Originally Posted by}}$ @Vocaloid hint: multiplying on the outside of the ⌊⌋ symbols (forgot what these are called) would be a <<<>>> $\color{#0cbb34}{\text{End of Quote}}$

Vocaloid · Answer

so yes, D

mikewwe13 · Answer

CAN YOU HELP WITH MORE ?

Vocaloid · Answer

sure (no need to use all caps ^_^")