Questions
Single choice
A graph of the function with equation [math: y=sin(x)] is transformed by- a dilation of factor 4 from the [math: y] -axis - a translation of [math: π2] \frac{ \pi }{2} units in the positive direction of the [math: x] -axis- a translation of 1 unit in the positive direction of the [math: y] -axisThe equation of the image is given by:
Options
A.A. [math: y=sin(14(x−π2))+1] y=sin( \frac{1}{4} (x- \frac{ \pi }{2} ))+1
B.B. [math: y=4sin((x−π2))+1] y=4sin( (x- \frac{ \pi }{2} ))+1
C.C. [math: y=sin(12(x+π2))−1] y=sin( \frac{1}{2} (x+ \frac{ \pi }{2} ))-1
D.D. [math: y=4sin((x+π2))−1] y=4sin( (x+ \frac{ \pi }{2} ))-1
View Explanation
Verified Answer
Please login to view
Step-by-Step Analysis
We begin by restating the problem to ensure clarity: a graph of y = sin(x) undergoes three transformations in sequence: a dilation of factor 4 from the y-axis, a translation of π/2 units to the right along the x-axis, and a translation of 1 unit upward along the y-axis. We must determine the equation of the image.
Option A: y = sin(14(x − π/2)) + 1
- This option shows a horizontal compression inside the sine by a factor of 14 because the argument is 14 times (x − π/2). Such a large horizontal scaling is not consistent with the desc......Login to view full explanationLog in for full answers
We've collected over 50,000 authentic exam questions and detailed explanations from around the globe. Log in now and get instant access to the answers!
Similar Questions
Question textThe circular function [math: f(x)=sin(x)] has been dilated in the [math: y] axis direction by a factor [math: 3]\displaystyle {3}, translated [math: π3]\displaystyle {\frac{\pi}{3}} units in the positive direction of the [math: x] axis and translated [math: 8]\displaystyle {8} units in the negative direction of the [math: y] axis. The resulted function is [math: f(x)]=[input] Check Question 1
Question textThe circular function [math: f(x)=sin(x)] has been dilated in the [math: y] axis direction by a factor [math: 6]\displaystyle {6}, translated [math: 2π3]\displaystyle {\frac{2\,\pi}{3}} units in the positive direction of the [math: x] axis and translated [math: 6]\displaystyle {6} units in the negative direction of the [math: y] axis. The resulted function is [math: f(x)]=[input] Check Question 1
Question textThe circular function [math: f(x)=sin(x)] has been dilated in the [math: y] axis direction by a factor [math: 4]\displaystyle {4}, translated [math: π4]\displaystyle {\frac{\pi}{4}} units in the positive direction of the [math: x] axis and translated [math: 7]\displaystyle {7} units in the negative direction of the [math: y] axis. The resulted function is [math: f(x)]=[input] Check Question 1
Question textThe circular function [math: f(x)=sin(x)] has been dilated in the [math: y] axis direction by a factor [math: 4]\displaystyle {4}, translated [math: π4]\displaystyle {\frac{\pi}{4}} units in the positive direction of the [math: x] axis and translated [math: 7]\displaystyle {7} units in the negative direction of the [math: y] axis. The resulted function is [math: f(x)]=[input] Check Question 1
More Practical Tools for Students Powered by AI Study Helper
Making Your Study Simpler
Join us and instantly unlock extensive past papers & exclusive solutions to get a head start on your studies!