The-Ever-Kid
Reputation
250
Top tag
Next privilege 500 Rep.
Access review queues
 Oct17 awarded Popular Question Oct12 awarded Nice Question May14 awarded Yearling Sep21 awarded Custodian Jul5 accepted System of two Equations Jul5 accepted Functional Inequality question where $\int^x_0\frac1{f'(t)}dt = \int^x_02f(t)dt$ ,$0 \leq x \leq 1$ and $f(0) = 0$ Jul5 comment Functional Inequality question where $\int^x_0\frac1{f'(t)}dt = \int^x_02f(t)dt$ ,$0 \leq x \leq 1$ and $f(0) = 0$ Thanks this is what confused me coz i remembered my teacher saying somthing like diffrentiating inequalities doesnt always satisfy it though integration does and thought that it applies to equalities to.....silly me :p Jul5 comment Functional Inequality question where $\int^x_0\frac1{f'(t)}dt = \int^x_02f(t)dt$ ,$0 \leq x \leq 1$ and $f(0) = 0$ Always ?....... Jul5 comment Functional Inequality question where $\int^x_0\frac1{f'(t)}dt = \int^x_02f(t)dt$ ,$0 \leq x \leq 1$ and $f(0) = 0$ but differentiating two equal integrals doesn't necessarily make them equal right ? Jul5 asked Functional Inequality question where $\int^x_0\frac1{f'(t)}dt = \int^x_02f(t)dt$ ,$0 \leq x \leq 1$ and $f(0) = 0$ Jul4 revised Do the two same curves give different area? Image Change : Included the WolframAlpha image (with Edits) Jul4 suggested approved edit on Do the two same curves give different area? Jul4 accepted How is the Integral of $\int_a^bf(x)~dx=\int_a^bf(a+b-x)~dx$ Jul4 accepted $f \colon [0,4] \rightarrow\mathbb{R}$, $a \in (0,4)$, find $(f(4))^2-(f(0))^2$ Jul4 asked $f \colon [0,4] \rightarrow\mathbb{R}$, $a \in (0,4)$, find $(f(4))^2-(f(0))^2$ Jul4 awarded Critic Jul4 asked How is the Integral of $\int_a^bf(x)~dx=\int_a^bf(a+b-x)~dx$ Jun15 reviewed Approve Summation of a series. Jun15 accepted Summation of a series. Jun15 asked Summation of a series.