Let a=\int_0^1 ydx , then y'=y+a which will give y(x)=ce^x-a Now y(0)=1, so c=a+1 . So y=(a+1)e^x-a Now a=\int_0^1 ydx=\int_0^1 ([a+1]e^x-a)dx=(a+1)(e-1)-a . So from this equation a=\frac{e-1}{3-e} ...

The differential equation you get is correct. Let's define k^2:=c, then we have (y')^2+y^2=k^2\implies y'=\pm\sqrt{k^2-y^2} This is a seperable equation, thus we have \pm\int\frac{dy}{\sqrt{k^2-y^2}}=x+A ...

Suppose that on two infinitesimal intervals A = [a, a+dx] and B = [b, b+dx], we have a < b, y > \epsilon on A and y< 1 - \epsilon on B. Let C = [0,1] - A - B. Since g is strictly ...

No matter the what the function y is, the function (y^2(t)-1)^2 is always nonnegative, so the smallest that F(y)=\int_0^1 (y^2(t)-1)^2\,dt could possibly be is zero. Is there any continuous ...

I agree with your computations; these functions are not normalized. In fact, Mathematica is able to compute the exact value of of the the squared norm of the first function to be \int_0^1 Y_1^2(1,x) = \frac{(\sin (\beta_1 )-\sinh (\beta_1 ))^2}{(\cos (\beta_1 )-\cosh (\beta_1))^2}. ...

First of all, note how your second solution is merely a special case c_1=\pm\frac i{\sqrt3}, c_2=c_3 of the first solution. So you might as well pick c_1=i to obtain a vanishing integral, which ...