Read the task carefully. You proved that \int_0^1 f^2(t)dt\in[0,1]. The task however asks, whether f assumes the value of the integral, that is: Is there a x\in[0,1], such that f(x)=\int_0^1 f^2(t)dt ...

Since B_1 = \int_{0}^{1}\mathrm dB_t, we have \int_{0}^{1}B_t\ \mathrm dt = \int_{0}^{1}(1-t)\ \mathrm dB_t, the limit of sums of independent gaussian random variables, with distribution \mathcal N(0, \int_{0}^{1}(1-t)^2\ \mathrm dt) ...

I do this, is this correct? p(x)=a+bx+cx^2+dx^3 p'(x)=b+2cx+3dx^2 \int_0^1 p(t)=ax \Bigg|_0^1 + \frac{bx^2}{2} \Bigg|_0^1+\frac{cx^3}{3} \Bigg|_0^1+\frac{dx^4}{4}\Bigg|_0^1 = a+\frac{b}{2}+\frac{c}{3}+\frac{d}{4} ...

This result seems to apply to vector spaces over both \Bbb R and \Bbb C, so I'll resort to the complex case in the following; the real case is then implied. Thus I take \langle \cdot, \cdot \rangle ...

Building on Grumpy's comment, changing the order of integration in \int_0^1 \int_0^s t^t (1/s) \ dt\ ds gives \int_0^1 \int_t^1 t^t (1/s)\ ds\ dt = \int_0^1 t^t (-\ln t)\ dt. The claim in the ...

Hint: In your situation it is possible to write f=P_M f+P_{M^\perp} f, where P_M f\in M and P_{M^\perp} f\in M^\perp. Note that (f,u)=(P_M f,u)+(P_{M^\perp} f,u)=(P_M f,u) for u\in M. Now I ...