Your intuition is correct: for the first part, it is equal to \lfloor \frac{x}{\pi} \rfloor \int_{0}^{\pi}\sin (t) dt, which you can compute. The second one is equal to \int_{0}^{x-\pi \lfloor \frac{x}{\pi} \rfloor}\sin (t) dt ...

Evaluate: \large\displaystyle f(x) = \large\displaystyle\int_{0}^{2x^2} e^{2t^2} sin t \, dt \large\displaystyle\star It’s a non integrable function and can’t be represented using elementary ...

Hint: \begin{align} \sin(t-\tau)\sin(2\tau) &=\frac{\cos(t-3\tau)-\cos(t+\tau)}{2}\\ &=\frac{\cos(t)\cos(3\tau)+\sin(t)\sin(3\tau)}{2}\\ &-\frac{\cos(t)\cos(\tau)-\sin(t)\sin(\tau)}{2}\tag{1} \end{align} ...

For any continuous f:\mathbb R\to (0,1) and any t\in \mathbb R we have |f(t)\sin t|\leq |\sin t|\leq 1. So for x>0 we have |\int_0^xf(t)\sin t \;dt|\leq \int_0^x |f(t)\sin t|\;dt \leq \int_0^x|\sin t|\;dt\leq \int_0^x 1 \;dt =x<e^x ...

Both (C) (D)would be the correct answer. Set g(x)=x^{9}-f(x), h(x)=x-\displaystyle \int_{0}^{\dfrac{\pi-2x}{2}} f(t)\ cost\ dt, g(x) and h(x) are both continuous g(0)=0-f(0)<0 g(1)=1-f(1)>0 ...

Hint: Using Itô's formula, show that X_t := \sin(W_t) e^{t/2} satisfies dX_t = \cos(W_t) e^{t/2} \, dW_t. Conclude that \sin(W_T) = \int_0^T e^{-(T-t)/2} \cos(W_t) \, dW_t. Remark: The ...