Answer:
Step-by-step explanation:
We are given a trigonometric function f(x) = β3 cos(2x β Ο) + 2.
We need to explain the transformations in the given function being applied.
We can see that 2 is being added to β3 cos(2x β Ο) in th given function.
According to rules of transformations, y=f(x)+D, shifts D units up if D is a positive number.
Therefore, for adding 2 in β3 cos(2x β Ο), it would shift 2 units up.
Let us see other transformation being applied there.
We can see that Ο is being subtracted in parenthesis from 2x.
According to rules of transformations, y=f(x-C), shifts C units right if C is a positive value.
Therefore, on subtracting Ο from 2x in β3 cos(2x) inside parenthesis, the function shifts Ο units right.
Therefore, correct option for transformations would be :
