Question #37548

Your question (max 1024 symbols)I na bank,principal increses continusoly at the rate of r% per year.find thevalue of r if Rs 100 double itself in 10 years(log e^2=0.6931)?I na bank,principal increses continusoly at the rate of 5% per year.find thevalue of r if Rs 1000 double itself in 10 years(le^1/2=0.1648)?

Expert's answer

Answer on Question #37548 – Math - Differential Calculus

Let p,tp, t, and rr represent the principal, time, and rate of interest respectively. It is given that the principal increases continuously at the rate of r%r\% per year. So we have


dpdt=p(r100)\frac{dp}{dt} = p \left(\frac{r}{100}\right)dpp=r100dt\frac{dp}{p} = \frac{r}{100} dt


Integrate both sides


dpp=r100dt\int \frac{dp}{p} = \int \frac{r}{100} dtlnp=rt100+const=rt100+k\ln p = \frac{rt}{100} + \text{const} = \frac{rt}{100} + kp=ert100+kp = e^{\frac{rt}{100} + k}


For t=0,p=100t = 0, p = 100:


100=e0+k=ek100 = e^{0 + k} = e^{k}


For t=10t = 10, we have p=2100=200p = 2 \cdot 100 = 200:


200=er10+k200 = e^{\frac{r}{10} + k}200=er10ek=er10100200 = e^{\frac{r}{10}} \cdot e^{k} = e^{\frac{r}{10}} \cdot 100r10=ln2\frac{r}{10} = \ln 2r=0.693110=6.931r = 0.6931 \cdot 10 = 6.931


The value of rr is 6.93%.

Consider the second case. Let pp and tt be the principal and time respectively. It is given that the principal increases continuously at the rate 5% per year. Then we have


dpdt=p(5100)\frac{dp}{dt} = p \left(\frac{5}{100}\right)dpp=120dt\int \frac{dp}{p} = \int \frac{1}{20} dtlnp=t20+k\ln p = \frac{t}{20} + kp=et20+kp = e^{\frac{t}{20} + k}


For t=0,p=1000t = 0, p = 1000:


1000=e0+k=ek1000 = e^{0 + k} = e^{k}


If t=10t = 10, then:


p=e12+kp = e^{\frac{1}{2} + k}p=e1/2ek=e121000=1.6481000=1648p = e^{1/2} \cdot e^{k} = e^{\frac{1}{2}} \cdot 1000 = 1.648 \cdot 1000 = 1648


After 10 years the amount will worth 16481648.

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