Wize High School Grade 11 Math Textbook > Trigonometry

Primary Trig Ratios (Review)

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Primary Trigonometric Ratios--Sin, Cos, Tan
sin⁡θ=OppHyp          cos⁡θ=AdjHyp          tan⁡θ=OppAdj\large
\boxed{\sin\theta=\dfrac{Opp}{Hyp}~~~~~~~~~~
\cos\theta=\dfrac{Adj}{Hyp}~~~~~~~~~~
\tan\theta=\dfrac{Opp}{Adj}}sinθ=HypOpp​          cosθ=HypAdj​          tanθ=AdjOpp​​

How do we remember this?
SOHsinθ=Opposite/Hypotenuse\begin{array}{ccccc}
\Large{\text{S}}&&\Large{\text{O}}&&\Large{\text{H}}\\
\text{\colorTwo{s}in}\theta&\scriptsize{=}&\text{\colorTwo{O}pposite}&\scriptsize{/}&\text{\colorTwo{H}ypotenuse}
\end{array}Ssinθ​=​OOpposite​/​HHypotenuse​   

CAHcosθ=Adjacent/Hypotenuse\begin{array}{ccccc}
\Large{\text{C}}&&\Large{\text{A}}&&\Large{\text{H}}\\
\text{\colorTwo{c}os}\theta&\scriptsize{=}&\text{\colorTwo{A}djacent}&\scriptsize{/}&\text{\colorTwo{H}ypotenuse}
\end{array}Ccosθ​=​AAdjacent​/​HHypotenuse​

TOAtanθ=Opposite/Adjacent\begin{array}{ccccc}
\Large{\text{T}}&&\Large{\text{O}}&&\Large{\text{A}}\\
\text{\colorTwo{t}an}\theta&\scriptsize{=}&\text{\colorTwo{O}pposite}&\scriptsize{/}&\text{\colorTwo{A}djacent}
\end{array}Ttanθ​=​OOpposite​/​AAdjacent​

PAGE BREAK
Calculator Time!
Watch Out!
*Make sure your calculator is in the correct degree (D) mode.

Use your calculator to evaluate the following trig ratios:
1.) sin⁡30°=\sin30\degree=sin30°=    0.5   

2.) cos⁡ 50°=\cos\ 50\degree=cos 50°=      0.6428     

3.) tan⁡23.5°=\tan23.5\degree=tan23.5°=      0.4348     

4.) sin⁡211°=\sin 211\degree=sin211°=      -0.5150     

5.) cos⁡180°=\cos180\degree=cos180°=      -1     

6.) tan⁡90°=\tan90\degree=tan90°=      error (undefined)     

Practice: Primary Trig Ratios
Use a calculate to evaluate the following.

a) cos⁡60°=\cos60\degree=cos60°=

b) sin⁡200°=\sin200\degree=sin200°=

c) tan⁡190°=\tan190\degree=tan190°=

d) sin⁡300°=\sin300\degree=sin300°=

e) cos⁡0°=\cos0\degree=cos0°=

f) tan⁡270°=\tan270\degree=tan270°=

*Round your answer to 2 decimal places. Enter DNE if the answer is undefined (error).

I don't know

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Practice: Primary Trig Ratios
Given the following triangle, find all of the primary trig ratios.

sin⁡θ=OppHypsin⁡θ=1213cos⁡θ=AdjHypcos⁡θ=513tan⁡θ=OppAdjtan⁡θ=125\begin{array}{ccccc}

\begin{array}{rcl}
\sin\theta&=&\dfrac{Opp}{Hyp}\\[1em]
\sin\theta&=&\dfrac{12}{13}
\end{array}

&&
\begin{array}{rcl}
\cos\theta&=&\dfrac{Adj}{Hyp}\\[1em]
\cos\theta&=&\dfrac{5}{13}
\end{array}

&&
\begin{array}{rcl}
\tan\theta&=&\dfrac{Opp}{Adj}\\[1em]
\tan\theta&=&\dfrac{12}{5}
\end{array}

\end{array}sinθsinθ​==​HypOpp​1312​​​​cosθcosθ​==​HypAdj​135​​​​tanθtanθ​==​AdjOpp​512​​​

Practice: Primary Trig Ratios
Given the following triangle, find all of the primary trig ratios.

\Large{\color{black}{\sin\theta=}}

\Large{\color{black}{\cos\phi=}}

\Large{\color{black}{\tan\phi=}}

\Large{\color{black}{\tan\theta=}}

I don't know

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Example: Solving Equations w/ Primary Trig Ratios
Solve the following equations for xxx.

a) tan⁡30°=x10\tan30\degree=\dfrac{x}{10}tan30°=10x​

tan⁡30°=x10tan⁡30°×10=x10×10tan⁡30°×10=x(0.577)×10≈x5.77≈xx≈5.77\begin{array}{rcl}
\tan30\degree&=&\dfrac{x}{10}\\[1em]
\tan30\degree\scriptsize{\colorTwo{\times10}}&=&\dfrac{x}{10}\scriptsize{\colorTwo{\times10}}\\[1em]
\tan30\degree\times 10&=&x\\[1em]
(0.577)\times10&\approx&x\\[1em]
5.77&\approx&x\\[1em]
x&\approx&5.77
\end{array}tan30°tan30°×10tan30°×10(0.577)×105.77x​===≈≈≈​10x​10x​×10xxx5.77​

Therefore, the exact answer for xxx is 10×tan⁡30°10\times\tan30\degree10×tan30°, which is approximately 5.775.775.77.

PAGE BREAK
b) sin⁡45°=3x\sin45\degree=\dfrac{3}{x}sin45°=x3​

sin⁡45°=3xsin⁡45°×x=3x×xsin⁡45°×x=3sin⁡45°×xsin⁡45°=3sin⁡45°x=3sin⁡45°x≈=30.707x≈4.24\begin{array}{rcl}
\sin45\degree&=&\dfrac{3}{x}\\[1em]
\sin45\degree\scriptsize\colorTwo{\times x}&=&\dfrac{3}{x}\scriptsize\colorTwo{\times x}\\[1em]\\
\sin45\degree \times x&=&3\\[1em]
\dfrac{\sin45\degree \times x}{\scriptsize\colorTwo{
\sin45\degree}}&=&\dfrac{3}{\scriptsize\colorTwo{\sin45\degree}}\\[1em]
x&=&\dfrac{3}{\sin45\degree}\\[1em]
x&\approx&=\dfrac{3}{0.707}\\[1em]
x&\approx&4.24
\end{array}sin45°sin45°×xsin45°×xsin45°sin45°×x​xxx​=====≈≈​x3​x3​×x3sin45°3​sin45°3​=0.7073​4.24​

Therefore, the exact answer is 3sin⁡45°\dfrac{3}{\sin 45\degree}sin45°3​, which is approximately 4.24.

Practice: Solving Equations w/ Primary Trig Ratios
Solve for xxx in the equation cos⁡135°=x8\cos135\degree=\dfrac{x}{8}cos135°=8x​

Round your answer for

x

to 2 decimal places

I don't know

Practice: Solving Equations w/ Primary Trig Ratios
Solve for xxx in the equation sin⁡150°=−5x\sin150\degree=-\dfrac{5}{x}sin150°=−x5​

Round your answer for

x

to 2 decimal places

I don't know

Practice: Primary Trig Ratios
A ramp to a house has an angle that measures 30°30\degree30° as shown in the picture below. 

Using our calculators, we can see that sin⁡30°=12\sin30\degree=\dfrac{1}{2}sin30°=21​. 

True or False?
The height of the ramp must measure 1 meter and the length must be 2 meters. Justify your answer.

I don't know