let f(x) =∫_0 ^1 (dt/(1+xch(t))) with x real
1) determine a explicit form of f(x)
2)find also g(x)=∫_0 ^1 (dt/((1+xch(t))^2 ))
3) calculate ∫_0 ^1 (dt/(1+3ch(t))) and
∫_0 ^1 (dt/((1+3ch(t))^2 ))
Two particles P and Q move towards each
other along a straight line MN, 51 meters
long. P starts fromM with velocity 5 ms^(−1)
and constant acceleration of 1 ms^(−2) . Q starts
from N at the same time with velocity 6 ms^(−1)
and at a constant acceleration of 3 ms^(−2) .
Find the time when the:
(a) particles are 30 metres apart;
(b) particles meet;
(c) velocity of P is (3/4) os the velocity of Q.