![SOLVED: If y varies inversely to the square of x and x=5 when y=100 then find x when y=25 a. 10 b. 50 c. 100 d. 20 SOLVED: If y varies inversely to the square of x and x=5 when y=100 then find x when y=25 a. 10 b. 50 c. 100 d. 20](https://cdn.numerade.com/ask_previews/075c60a0-ae73-47f7-b5dd-b9181fa98a1e_large.jpg)
SOLVED: If y varies inversely to the square of x and x=5 when y=100 then find x when y=25 a. 10 b. 50 c. 100 d. 20
![If y varies inversely with x, and y = 20 when x = 5, then find the constant of variation (a). - Brainly.com If y varies inversely with x, and y = 20 when x = 5, then find the constant of variation (a). - Brainly.com](https://us-static.z-dn.net/files/d98/2cc99f501ae9b8398c9b73eb12abe2f3.jpg)
If y varies inversely with x, and y = 20 when x = 5, then find the constant of variation (a). - Brainly.com
![Use the provided graph to determine whether y varies directly as some power of x or inversely as some power of x. Explain. | Homework.Study.com Use the provided graph to determine whether y varies directly as some power of x or inversely as some power of x. Explain. | Homework.Study.com](https://homework.study.com/cimages/multimages/16/66782281268990168041114051.png)
Use the provided graph to determine whether y varies directly as some power of x or inversely as some power of x. Explain. | Homework.Study.com
![Variation Chapter 9.1. Direct Variation As x increases/decreases, y increases/decreases too. y = kx k is called the Constant of Variation k ≠ 0 “y varies. - ppt download Variation Chapter 9.1. Direct Variation As x increases/decreases, y increases/decreases too. y = kx k is called the Constant of Variation k ≠ 0 “y varies. - ppt download](https://images.slideplayer.com/24/7493678/slides/slide_3.jpg)
Variation Chapter 9.1. Direct Variation As x increases/decreases, y increases/decreases too. y = kx k is called the Constant of Variation k ≠ 0 “y varies. - ppt download
![Direct Variation If two quantities vary directly, their relationship can be described as: y = kx where x and y are the two quantities and k is the constant. - ppt video Direct Variation If two quantities vary directly, their relationship can be described as: y = kx where x and y are the two quantities and k is the constant. - ppt video](https://slideplayer.com/slide/10925224/39/images/5/Assume+y+varies+directly+as+x..jpg)