\displaystyle{v}={a}+\frac{{1}}{{t}} Explanation: Given, \displaystyle{a}={v}-\frac{{1}}{{t}} Add \displaystyle\frac{{1}}{{t}} to both sides. \displaystyle{a}{\left({i}\right)}{\left(+\frac{{1}}{{t}}\right)}={v}-\frac{{1}}{{t}}{\left({i}\right)}{\left(+\frac{{1}}{{t}}\right)} ...

a=v-u/t  No solutions found Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation :                      a-(v-u/t)=0  Step by ...

That triangle means variation.symolically a Roman Delta.the equation says: Acceleration = V2-V1/t2-t1.where 1 &2 refers to two different points on vel time graph/space.in other words, acceleration ...

See a solution process below: Explanation: First, multiply each side of the equation by \displaystyle{\left({3}\right)} to eliminate the need for parenthesis while keeping the equation balanced: ...

You're not using the "only if" part. If a>0, then f(x+1)>f(x)+1 for large enough x. Thus if f(n)=m where n, m are integers, then f(n+1)>m+1, so by the intermediate value theorem there ...

You had the right idea, just did the integral wrong. Using u=s-600, we see du=ds so \int{\frac{1}{(s-600)^2}ds}=\int{\frac{1}{u^2}du}=\int{u^{-2}du}=-u^{-1}=\frac{-1}{s-600}