240 reputation
110
bio website theforeverkid.wordpress.com
location India
age 20
visits member for 2 years, 4 months
seen May 23 '13 at 10:26

Hello there! I'm The-Forever-Kid (a.k.a Ankit).I'm a High School Student with a passion for Physics & I'm Indian . I've got this nasty reputation of shying away from Chemistry ( READ:HATE ) study hours with my Physics textbook open.

For People interested there's this other site too for physics Q&A : physicsforums.com

Apart from that im studying for IITJEE (its this huge, gigantically competitive exam in India to get into an IIT(an engineeering college))

BTW: I Love Manga too.


May
14
awarded  Yearling
Sep
21
awarded  Custodian
Jul
5
accepted System of two Equations
Jul
5
accepted Functional Inequality question where $\int^x_0\frac1{f'(t)}dt = \int^x_02f(t)dt $ ,$ 0 \leq x \leq 1$ and $f(0) = 0$
Jul
5
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
Jul
5
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 ?.......
Jul
5
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 ?
Jul
5
asked Functional Inequality question where $\int^x_0\frac1{f'(t)}dt = \int^x_02f(t)dt $ ,$ 0 \leq x \leq 1$ and $f(0) = 0$
Jul
4
revised Do the two same curves give different area?
Image Change : Included the WolframAlpha image (with Edits)
Jul
4
suggested suggested edit on Do the two same curves give different area?
Jul
4
accepted How is the Integral of $\int_a^bf(x)~dx~~=\int_a^bf(a+b-x)~dx$
Jul
4
accepted $f \colon [0,4] \rightarrow\mathbb{R}$, $a \in (0,4) $, find $(f(4))^2-(f(0))^2$
Jul
4
asked $f \colon [0,4] \rightarrow\mathbb{R}$, $a \in (0,4) $, find $(f(4))^2-(f(0))^2$
Jul
4
awarded  Critic
Jul
4
asked How is the Integral of $\int_a^bf(x)~dx~~=\int_a^bf(a+b-x)~dx$
Jun
15
reviewed Approve suggested edit on Summation of a series.
Jun
15
accepted Summation of a series.
Jun
15
asked Summation of a series.
Jun
3
comment System of two Equations
@DrewChristianson I think we've both been reassured that tone does not always come through well on the internet. Not really 'cause in real life we never get second chances to clarify. If one gets pissed off that's it end of story . At least here you get to clarify your intent/tone.
Jun
2
comment System of two Equations
@DrewChristianson Calm down dude.. I'm not sure what you used to graph the equations that's what you said so i told you what i used. Just because yours is from mathematica doesn't make it more right I know pal, mine is incorrect cause it was my error...i solved for y in the second equation hence the error. You seriously need to calm down.. I'm not sure what you're getting at with your comment about gnuplot. I guessed gnuplot, 'cause gnuplot always plots the first eq with red the other with green..anyways thanks