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sqrt[(48t)9] = sqrt(489)*sqrt(t9) = sqrt(488)*sqrt(48)*sqrt(t)*sqrt(t8) = 484*sqrt(48)*sqrt(t)*t4 = 5308416*6.9282*t4*sart(t) = 36777785*t4*sqrt(t)
T1= t2= t3= t4= r=
(e3.50t - t2)/(1 + t4)
My suggestion is to multiply the binomials and do the integration directly, and then differentiate the result with respect to x. (If that doesn't work, feel free to send me a picture of the problem and I'll give it another try.)
The ratio of the quantity between two sets of time an equal period apart are the same. That is, the rate of growth over the same time is a constant. Suppose V(t) is the value of the variable V at time t. Then, if t1, t2, t3 and t4 are four times such that t2 - t1 = t4 - t3 then V(t2)/V(t1) = V(t4)/V(t3) whether V is compound interest or exponential growth.