What Is The Range Of Y = –5Sin(X)? All Real Numbers Negative 5 Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To 5 All Real Numbers Negative Five-Halves Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To Five-Halves All Real Numbers Negative 1 Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To 1 All Real Numbers Negative One-Fifth Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To One-Fifth

Best apk References website

What Is The Range Of Y = –5Sin(X)? All Real Numbers Negative 5 Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To 5 All Real Numbers Negative Five-Halves Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To Five-Halves All Real Numbers Negative 1 Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To 1 All Real Numbers Negative One-Fifth Less-Than-Or-Equal-To Y Less-Than-Or-Equal-To One-Fifth. The transformation applied here is a vertical stretch by a factor of 5,. This results from the fact that sin(x) oscillates between −1 and 1.

Solved State the domain and range of the graph below. domain x= all
Solved State the domain and range of the graph below. domain x= all from www.gauthmath.com

The given information is that the range of the trigonometric function is [−5,5]. This results from the fact that sin(x) oscillates between −1 and 1. The range of the function y = −5sin(x) is −5 ≤ y ≤ 5, indicating that y can take any value between −5 and 5.

The Given Information Is That The Range Of The Trigonometric Function Is [−5,5].


The range of the function y = −5sin(x) is −5 ≤ y ≤ 5, indicating that y can take any value between −5 and 5. Solution −5≤f(x)≤5 +1 interval notation [−5,5] hide steps solution steps the range of the basic sinfunction is −1≤sin(x)≤1−1≤sin(x)≤1 multiply the edges of the range by: This results from the fact that sin(x) oscillates between −1 and 1.

The Transformation Applied Here Is A Vertical Stretch By A Factor Of 5,.


Popular Post :