Question

Consider the following function.

Graph the original function by indicating how the more basic function has been shifted, reflected, stretched, or compressed.

Answer 1

@vocaloid @surjithayer @snowflake0531

Answer 2

@vocaloid @surjithayer @snowflake0531

Answer 3

\[p(x)=(x-4)^3\]
is this the original function?

Answer 4

or
original function is \[f(x)=x^3\]

Answer 5

sorry
\[p(x)=x^3\]

Answer 6

if original function is \[p(x)=x^3~~~~...(1)\]
new functin is \[p(x)=(x-4)^3~~~~...(2)\]
(2) is obtained by 4 units Horizontal shift of (1)

Answer 7

the horizontal shift is left ?

Answer 8

if (1) is original function ,then (2) is Horizontal shift by 4 units right.

Answer 9

vrtical stretch-none

Answer 10

no reflection on x-axis or y-axis.

Answer 11

okay , the horizontal shift is right and 4 units?

Answer 12

and vertical shirt is ?

Answer 13

none

Answer 14

shift sorry and okay

Answer 15

if function is \[p(x)=(x-4)^3+p\]
if p is positive,then vertical shift up
if p is negative then vertical shift is down.
if p=0,then no vertical shift.

Answer 16

it's up

Answer 17

am i right ?

Answer 18

am i right ?

Answer 19

function is
\[p(x)=(x-4)^3\]
it has no vertical shift.

Answer 20

it was right and 4 , it was wrong

Answer 21

what you mean?

Answer 22

everything was right but i put in something else

Answer 23

am i correct?