Answer:
dx/dt = -3/5 time/week.
Explanation:
[tex]p-x^2/2=48\\x^2 = 2(p-48)\\x^2=2p-96[/tex]
differentiating both sides w.r.t t time.
[tex]2x(dx/dt)=2dp/dt\\dp/dt=xdx/dt\\[/tex]
given [tex]dp/dt=-3\\x=5\\\\[/tex]
[tex]dx/dt =-3/5[/tex] times / week
Answer:
600 tires/week OR dx/dt=-3/5 thousand tires/week
Explanation:
where x is measured in units of a thousand and p is in dollars. $ p - \dfrac{1}{2}x^2 = 48 $ How fast is the weekly supply of Super Titan radial tires being introduced into the marketplace when x = 5, p = 60.5, and the price/tire is decreasing at the rate of $3/week?
p-1/2x^2=48
differentiating both sides with respect to time
d/dt(p-1/2x^2)=d/dt(48)
[tex]p^{'} +\frac{1*2x*x^{'} }{2} =0[/tex]
dp/dt+x dx/dt=0
-3=5dx/dt
dx/dt=-3/5
recall that x is measured in units of thousands
dx/dt=-0.6*1000
dx/dt=600 tires/week
OR dx/dt=-3/5 thousand tires/week
the 600 quantity supply of Super Titan radial tires decreases per each week
