Question

Please Help!!!!

Answer 1

@ganeshie8

Answer 2

I think you just need to plugin the value of \(I'\) and evaluate the integral

Answer 3

Accumulated Capital in 5 years = \(\large \int \limits_0^5100t ~dt\)

Answer 4

evaluate the integral

Answer 5

Can solve? step by step?

Answer 6

familiar with integration ?

Answer 7

\(\large \int \limits_0^5100t ~dt\)


\(\large 100\int \limits_0^5t ~dt\)

Answer 8

then, use : \(\large \int x^n dx = \frac{x^{n+1}}{n+1}\)

Answer 9

\(\large \int \limits_0^5100t ~dt\)


\(\large 100\int \limits_0^5t ~dt\)



\(\large 100\left(\dfrac{t^2}{2}\Bigg|_0^5\right)\)



\(\large 100\left(\dfrac{5^2}{2} - 0\right)\)



\(\large 1250 \)

Answer 10

Now I understand this question .... my friend can get so \[50t^2+constant\] + constant

Answer 11

is correct as well?

Answer 12

@fabiomartins - your friend assumes this integral is non-definite, but since this is a definite integral, ganeshie8 is correct.