Since the sine function can be represented using thesecant function, we can write sin 300° as -√(sec²(300°) - 1)/sec 300°. The value of sec 300° is equal to 2. What is the Value of Sin 300 Degrees in Terms of Cot 300°?
( (sin)(2⋅ 150))Multiply( 2) by ( 150).( (sin)(300))Apply the reference angle by finding the angle with equivalent trig values in the first quadrant. Make the expression negative because sine is negative in the fourth quadrant.( -(sin)(60))The exact value of ( (sin)(60)...
Tangent of 30 degrees as a fraction is 1/√3 (or) √3/3. Tan 30 in terms of decimals is approximately 0.577. We can find the value of tangent of 30 in multiple ways. Explore all the ways and also solve a few examples using tan 30 degrees.
Calculation of the Value of Sin 45 Degree in Fraction Sin 0° = \[\frac{\sqrt{0}}{\sqrt{4}}\] = 0 Sin 30° = \[\frac{\sqrt{1}}{\sqrt{4}}\] =1/2 Sin 45° = \[\frac{\sqrt{2}}{\sqrt{4}}\] = \[\frac{1}{\sqrt{2}}\] Sin 60° = \[\frac{\sqrt{3}}{\sqr...
Tan 0 degree in fraction can be expressed as, Tan 0 degrees equal to Sin 0° / Cos 0° We know than Sin 0 ° = 0 and Cos 0° = 1 Therefore, the Tan 0 is equal to 0/1 or 0. It implies that Tan 0 is equal to 0. ...
in the unit circle. the reference angle is formed when the perpendicular is dropped from the unit circle to the x-axis, which forms a right triangle. since, the angle 150 degrees lies on the iind quadrant, therefore the value of sin 150 is positive.the internal angle of triangle is 180...
Question: 1. a) Find the exact value: sin(150)= cos(150)= b) sin(135)= cos(135)= c.) sin(1290)= cos(1290)= 1. a) Find the exact value: sin(150)= cos(150)= b) sin(135)= cos(135)= c.) sin(1290)= cos(1290)=...
2.1.1700 Part 1 Section 22.1.2.98, smallFrac (Small Fraction) 2.1.1701 Part 1 Section 22.1.2.99, sPre (Pre-Sub-Superscript Object) 2.1.1702 Part 1 Section 22.1.2.101, sSub (Subscript Object) 2.1.1703 Part 1 Section 22.1.2.103, sSubSup (Sub-Superscript Object) 2.1.1704 Part ...
View Solution ifsin2A=2sinAcosAandsin20∘=K, then the value ofcos20∘cos40∘cos80∘cos160∘− View Solution " The value of(sin17∘)(cos13∘)+(cos17∘)(sin13∘)(cos23∘)(cos37∘)−(sin157∘)(sin37∘)is equal to ...
of the perturbed eigenvalues as the Dirichlet part shrinks to a pointx^*\in \partial Min terms of the spectral parameters of the unperturbed system. This asymptotic expansion demonstrates the impact of the geometric properties of the manifold at a specific pointx^*. Furthermore, it becomes ...