Find the exact value of sin 2theta if tan theta = -1/4 with theta in QII.Find the exact values for sin theta, cos theta, and tan theta.Find the exact value of sin theta and tan theta when cos theta has the indicated value. cos theta = 1Find the exact value of sin t...
Answer to: Find the exact value of sin theta and tan theta when cos theta has the indicated value. cos theta = 1 By signing up, you'll get...
function Value \cos(\theta) = \frac{16}{65} Constraint \theta lies in Quadrant III \sin(\theta) = \\\cos(\theta) = \\\tan(\theta) = \\\csc(\theta) = \\\sec(\theta) Find the value of the six trigonometric funct...
Step by step video & image solution for Show that the value of tan (theta+(pi)/(6)) cot( theta-(pi)/(6)) cannot lie between (2+sqrt(3))^(2) and (2-sqrt(3))^(2). by Maths experts to help you in doubts & scoring excellent marks in Class 12 exams.Updated on:21/07/2023...
If (theta) lies in III quadrant and sin theta=(-4)/(5), then the value of tan^(2)((theta)/(2)) is equal to
The kinematic properties of the micropolar surface structure determine the relations between surface stresses and couple-stresses, and the displacement and rotation fields of the surface. On the other hand, due to continuity, the surface kinematic properties are equivalent to those of the micropolar ...
cite this article 1598 accesses metrics details abstract in this study, we consider a prey–predator model with prey refuge and intraspecific competition between predators using the crowley–martin functional response and investigate the dynamic characteristics of spatial and nonspatial prey–predator ...
sin alpha = dfrac{3}{5} ( alpha in first quadrant) and cos beta = -dfrac{15}{17} ( beta in second quadrant). Find the exact value of \cos (\theta + \alpha) using the given information. \sin \theta = 1/6 with \theta ...
\begin{aligned}& \theta_{1}(x,\eta) ={\cos\eta(x-1)} + \bigcirc \biggl( \frac {e^{(x-1) \operatorname{Im} \eta}}{\eta} \biggr) . \end{aligned} (2.9) Further, by virtue of (2.9) and (2.10) of [34], we have \begin{aligned}& \varphi(1,\eta) =\cosh\eta+...
This chapter is dedicated entirely to the Mean Value Theorem and its complex history. The opening section offers modern statements of the Mean Value Theorem and some of its variants, proofs of these results, their interrelations, and some applications. T