\displaystyle{G}^{'}{\left({x}\right)}=-{\cos{{\left({x}^{{2}}\right)}}} Explanation: Let us try to evaluate the derivative from first principles, i.e. using \displaystyle{G}^{'}{\left({x}\right)}=\lim_{{{h}\to{0}}}\frac{{{G}{\left({x}+{h}\right)}-{G}{\left({x}\right)}}}{{h}} ...

We use the Fundamental Theorem of Calculus If f is continuous on [a, b] and defining F(x) = \int_a^x \! f(t) \, dt for x \in [a, b], then F'(x) = f(x) for x \in (a,b). Thus the ...

Since the density is \rho \left( {x,y} \right) = \int\limits_x^1 {\cos \left( {{t^2}} \right)} dt This is a Fresnel Integral which cannot be determined in terms of standard elementary functions. ...

Hint f(x + \pi) = \int_0^{x + \pi} \cos^4(t) \, dt Split the above interval into the sum of two integral. Use the property that \cos^4(t) is a periodic function with period \pi.

One may recall that if f(x) is continuous on [a,b], then the average value of f(x) on [a,b] is defined to be I=\frac1{b-a}\int_a^b f(x)\,dx. Applying it here gives \begin{align} I=\int_0^1 \left(\int_x^1 \cos(t^2) \,dt\right)\,dx&=\left.x\int_x^1 \cos(t^2) \,dt \right|_0^1+\int_0^1 x \cos(x^2)\,dx \\\\&=0+\int_0^1 x \cos(x^2)\,dx \end{align} ...

First, we need to find a candidate for T. Using Gateaux variation, we see that \begin{align} T(f)g=&\ \frac{d}{dt}F(f+tg)\Big|_{t=0} = \frac{d}{dt}\int^x_0(f(s)+tg(s))^2\cos(s)\ ds\Big|_{t=0}\\ =&\ ...