250 reputation
112
bio website theforeverkid.wordpress.com
location India
age 20
visits member for 2 years, 7 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.


Oct
17
awarded  Popular Question
Oct
12
awarded  Nice Question
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 approved 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 Summation of a series.
Jun
15
accepted Summation of a series.
Jun
15
asked Summation of a series.