V = pi r^2 h
so try to factor out pi r^2
(I think you have a typo x^3 not r^3)
2 pi x^3 + 12 pi x^2 + 18 pi x
pi x^2 (2 x + 12 + 18/x)
if r = x^2 then h = (2x + 12 + 18/x)
so try to factor out pi r^2
(I think you have a typo x^3 not r^3)
2 pi x^3 + 12 pi x^2 + 18 pi x
pi x^2 (2 x + 12 + 18/x)
if r = x^2 then h = (2x + 12 + 18/x)
The volume of a cylinder is given by the formula V = πr^2h, where V represents the volume, r represents the radius, and h represents the height.
Given: V = 2Ï€er^3 + 12Ï€ex^2 + 18Ï€ex
Equating this to the formula for the volume of a cylinder, we have:
2πer^3 + 12πex^2 + 18πex = πr^2h
We can begin by factoring out πe from the first two terms:
πe(2r^3 + 12x^2) + 18πex = πr^2h
Divide both sides of the equation by πr^2:
e(2r^3 + 12x^2) + 18ex = rh
Now, we want to find the expressions for the radius (r) and height (h) in terms of x.
From the equation, we can see that e(2r^3 + 12x^2) is equivalent to rh - 18ex.
Substituting this into the equation, we have:
rh - 18ex + 18ex = rh
The -18ex and +18ex terms cancel out, leaving us with:
rh = rh
This equation shows that the radius and height can be expressed in any terms that satisfy the equation rh = rh. Hence, the expressions for the radius and height in terms of x are r = any expression and h = any expression, as long as the two expressions are equal.
Therefore, the expressions for the radius (r) and height (h) in terms of x could be any valid expressions that are equal to each other.