An isosceles triangle is inscribed inside a circle of radius 12 metres. Its height is increasing at a rate of 2 m/sec. At the instant when the height of the triangle is 18 m, at what rate a) its area changing? b) its perimeter changing?

Make a sketch.
Draw a radius to the base of the isosceles triangle.
let the base of the isosceles triangle be 2x, and let its height be h+12

area = (1/2)(2x)(h+12)
= x(h+12)

but x^2 + h^2 = 12^2
x^2 = 144 - h^2
x = (144 - h^2)^(1/2)

area = (144 - h^2)^(1/2)(h+12)

d(area)/dt = (1/2)(144-h^2)^(-1/2) (-2h)dh/dt + (144 - h^2)^(1/2) (dh/dt)
so when h = 6 and dh/dt = 2
(when h+12 = 18, my h = 6)

d(area)/dt = (1/2)(108)^(-1/2) (-16)(2) + 108^(1/2) (2)
= -16/√108 + 2√108
= (-16 + 216)/√108
= -4(4 + 54)/(6√3)
= - 116/(3√3) m^2/s

check my arithmetic, been making silly arithmetic errors lately

b)
let the side of the triangle be s
s^2 = x^2 + (h+12)^2
= 144 - h^2 + h^2 + 24h + 144
= 288 + 24h
s = √(288 + 24h) = 2(72 + 6h)^(1/2)

P = 2s + 2x
= 4(72 + 6h)^(1/2) + 2(144 - h^2)^(1/2)

take dP/dt, sub in h = 6, and dh/dt = 2