The table below shows the sixteen special angles around the unit circle and their respective values for each function. Answer and Explanation: We're required to evaluate the exact value of the given trigonometric expressions, $$\begin{align} \cot 45^\circ \\[0.2cm] \csc 45...
Related to this Question How do you verify (tan(x)) / (1 - cot(x)) + (cot(x)) /(1 - tan(x)) = 1 + sec(x) csc(x)? Verify the identity. sinx/1-sinx - cosx/1-cosx = 1-cotx/cscx-1 Verify csc(x) - tan(x) / sec(x) + cot(x) = cos(x) - sin^2(x) / sin...
Click here:point_up_2:to get an answer to your question :writing_hand:how do you prove 1cot2xcsc2x 2
error occurs only in version Excel 365 and is caused by a dynamic array being to large, meaning there are cells below and/or to the right that are not empty. This prevents the dynamic array formula expanding into new empty cells. #DIV/0 error- This error happens if you try to divide ...
LOG10(900) evaluates to approx 2.9542, add 4 to this number and we get the magnitude for the subsequent earthquake which is approx. 6.9542The image shows a graph representing the Richter scale for measuring earthquake intensity. The x-axis represents the Richter scale magnitude, ranging from 1...
2. a. Explain how the identities 1 + tan2θ = sec2 θ and cot2 θ + 1 = csc2θ can be derivedfrom the ideniitye^2=e^2,e^2,e=1b. The identity cos^2θ+sin^2θ=1 is true for all real numbers. Are the identities1 + tan2θ = sec2θ and cot2θ + 1= csc2 θ...
ateeq.rauf@itu.edu.pk Abstract: Deviating from the predominantly women-focused investigations on Islamic clothing in anthropology, religion and consumer studies, this research places men's Islamic clothing under the spotlight to understand how the notion of the extended self is evidenced in a religio...
Secant (Sec) Cosecant (Csc) Cotangent (Cot) 4 Conceptualize relationships. One of the most important things to understand about trigonometry is that all of the functions are interrelated. While values for Sine, Cosine, Tangent, etc. all have their own uses, they are most useful because of ...
If the graph of a function is given, we can determine the function's concavity or convexity, by looking where the tangent line to the graph lie with respect to the graph. If the tangent line to the graph is above the graph, the function is concave, and if the tangent line is below ...
How does the integral of {eq}\displaystyle \cot x {/eq} become {eq}\displaystyle -\ln(|(\csc x)|) +C {/eq}? Logarithm Properties When dealing with logarithm functions several properties are useful to reduce the expressions: {eq}\bullet {/eq}Sum, the sum of logarithms equals ...