Variation equations - If `x prop y` and x=4,y=2 then find y when x=18 Examples

We use cookies to improve your experience on our site and to show you relevant advertising. By browsing this website, you agree to our use of cookies. Learn more

Support us

~~I want to sell my website www.AtoZmath.com with complete code~~

2. Variation equations - If `x prop y` and x=4,y=2 then find y when x=18 example ( Enter your problem )

( Enter your problem )

Examples

Other related methods

Definition
If `x prop y` and x=4,y=2 then find y when x=18
If `x prop y`, then prove that `x^3+y^3 prop x^2y-xy^2`

1. Definition
(Previous method)

3. If `x prop y`, then prove that `x^3+y^3 prop x^2y-xy^2`
(Next method)

1. Examples

1. `x prop y and x=4,y=2.` Find `x=18,y=?`

Solution:
`x prop y`

`=>x=K*y`

Now, `x=4,y=2`

`=>4 = K * 2`

`=> K = (4)/(2)`

`=> K = 2`

Hence, `x=2*y`

`x=18,y=?`

`=>18=2 * y`

`=> (18)/(2) = y`

`=>y=9`

2. `x prop yz and x=8,y=4,z=3.` Find `x=?,y=6,z=4`

Solution:
`x prop yz`

`=>x=K*yz`

Now, `x=8,y=4,z=3`

`=>8 = K * 4*3`

`=>8 = K * 12`

`=> K = (8)/(12)`

`=> K = 2/3`

Hence, `x=2/3*yz`

`x=?,y=6,z=4`

`=>x=2/3 * 6*4`

`=>x=2/3 * 24`

`=>x=16`

3. `x prop y^3/z and x=8,y=4,z=3.` Find `x=?,y=6,z=4`

Solution:
`x prop y^3/z`

`=>x=K*y^3/z`

Now, `x=8,y=4,z=3`

`=>8 = K * 4^3/3`

`=>8 = K * 64/3`

`=> K = 8*3/64`

`=> K = 3/8`

Hence, `x=3/8*y^3/z`

`x=?,y=6,z=4`

`=>x=3/8 * 6^3/4`

`=>x=3/8 * 54`

`=>x=81/4`

This material is intended as a summary. Use your textbook for detail explanation.
Any bug, improvement, feedback then Submit Here