Answer:
2 cm/s
Step-by-step explanation:
y=√{1+x³}
x and y are dependent on t and so;
y(t) =√{1+x(t)³}
Thus;
dy/dx = y'(t) = [3x(t)²•x'(t)]/(2√{1+x(t)³})
We know that;
y=√{1+x³}
Thus;
y'(t) = [3x(t)²•x'(t)]/2y
We are given y' (t) at this instant t(o), thus; y '(t(o)) = 4
and also at that very same t(o);
x(t(o)) = 2 and y(t(o)) = 3
Thus;
Using, y'(t) = [3x(t)²•x'(t)]/2y, we obtain;
4 = [3 x 2² • x'(t)]/2 x 3
4 x 2 x 3 = 12(x'(t))
24 = 12 (x'(t))
(x'(t)) = 24/12 = 2 cm/s
