Answer:
a. -5 ft per sec
b. 59.5 ft² per sec
Step-by-step explanation:
a. Suppose l represents the ladder, x represents the height of the top of ladder from the base of house and y represents the distance of base of ladder from the base of house.
By the Pythagoras theorem,
[tex]l^2 = x^2 + y^2------(1)[/tex]
Differentiating with respect to t ( time ),
[tex]2l\frac{dl}{dt} = 2x \frac{dx}{dt}+2y\frac{dy}{dt}[/tex]
But, height of ladder, l = 13 ft = constant,
[tex]\implies \frac{dl}{dt}=0[/tex]
[tex]\implies 0= 2x \frac{dx}{dt}+2y\frac{dy}{dt}-----(2)[/tex]
We have,
y = 5, [tex]\frac{dy}{dt}=12\text{ ft per sec}[/tex],
Again by equation (1),
[tex]13^2 = x^2 + 5^2\implies 169 = x^2 + 25\implies 169 - 25 = x^2\implies 144 = x^2\implies x = 12\text{ ft}[/tex]
From equation (2),
[tex]0 = 2(12) \frac{dx}{dt} + 2(12)(5)[/tex]
[tex]0= 24\frac{dx}{dt}+120[/tex]
[tex]-120 =24\frac{dx}{dt}[/tex]
[tex]\implies \frac{dx}{dt}=-\frac{120}{24}=-5\text{ ft per sec}[/tex]
Hence, the rate of change of the height of the top of the ladder is -5 ft per sec.
b. Now area of the triangle = 1/2 × base × height
[tex]\implies A = \frac{1}{2}\times y\times x[/tex]
Differentiating with r. t. t,
[tex]\frac{dA}{dt}=\frac{1}{2}(y\frac{dx}{dt}+x\frac{dy}{dt})[/tex]
[tex] = \frac{1}{2}(5(-5) + 12(12))[/tex]
[tex]=\frac{1}{2}(-25 + 144)[/tex]
[tex]=\frac{119}{2}[/tex]
= 59.5 ft² per sec
Hence, area of the triangle is changing with the rate of 59.5 ft per sec.
