Question

prove the converse of cyclic quadrilateral Theorem​

Answer 1

what is menstruation and menstrual cycle? is there any difference between them?

$\small \displaystyle \rm \red{ \int \frac{ \tan(2x) \cos^{4} (2x) - \frac{ \sin^{4} (2x) }{ \cot(2x) } }{exp(2 \tan(x)) \cos(4x) \sqrt{1 - {sec}^{2} (2x)} } {sec}^{2}(x) \: dx }$

$\large\displaystyle \red{ { \rm{{\lim_{n \to \infty } {e}^{ - n} \sum_{ \mathbb{k = 0}}^{n} \frac{ {n}^{ \mathbb{k}} }{ \mathbb{k!}} }}}}$

The menstrual cycle, which is counted from the first day of one period to the first day of the next, isn't the same for every woman. Menstrual flow might occur every 21 to 35 days and last two to seven days. For the first few years after menstruation begins, long cycles are common.

Answer 2

Answer:

Converse of cyclic quadrilateral theorem Theorem : If a pair of opposite angles of a. quadrilateral is supplementary, the quadrilateral is cyclic.

Step-by-step explanation:

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