1.5 Trigonometry

Cards (48)

Arrange the SOH CAH TOA acronym in the correct order:
1️⃣ SOH
2️⃣ CAH
3️⃣ TOA
Cosine is defined as Adjacent / Hypotenuse. 
True
Sine, Cosine, and Tangent are the three primary trigonometric functions
What is the ratio for sine in a right-angled triangle?
Opposite / Hypotenuse
What is the radius of the unit circle?
1
What are trigonometric identities used for?
Simplifying expressions
The reciprocal identity for csc θ is $\frac{1}{\sin \theta}$
Trigonometric identities are true for all values of the variable for which the expressions are defined. 
True
What is the ratio for $\cos \theta$ in a right-angled triangle? 
$\frac{\text{Adjacent}}{\text{Hypotenuse}}$
What is the Quotient identity for $\tan \theta$ ? 
$\tan \theta =$ $\frac{\sin \theta}{\cos \theta}$
What is the Quotient identity for $\tan \theta$ ? 
$\tan \theta =$ $\frac{\sin \theta}{\cos \theta}$
What is the first step in solving trigonometric equations?
Isolate the function
What does the amplitude of a trigonometric graph represent?
Maximum displacement
The period of the graph y = 2sin(2x - π) is \pi
What transformations are applied to the graph y = sin(x) to obtain y = 2sin(2x - π)?
Vertical stretch, horizontal compression, right shift
In the unit circle, the y-coordinate of a point at angle θ is equal to sin θ.
True
Match the trigonometric transformation with its effect on the graph:
Amplitude Change ↔️ Stretches or compresses vertically
Period Change ↔️ Stretches or compresses horizontally
Phase Shift ↔️ Shifts the graph horizontally
What happens to the amplitude of the graph y = sin x when it is transformed to y = 2sin(2x - π)?
Stretched vertically by 2
The unit circle is a circle with a radius of 2.
False
Match the trigonometric function with its ratio in a right-angled triangle:
Sine (sin θ) ↔️ Opposite / Hypotenuse
Cosine (cos θ) ↔️ Adjacent / Hypotenuse
Tangent (tan θ) ↔️ Opposite / Adjacent
Sine, Cosine, and Tangent define ratios of sides in a right-angled triangle relative to an angle
Match the trigonometric function with its relationship to the unit circle:
Sine (sin θ) ↔️ y-coordinate
Cosine (cos θ) ↔️ x-coordinate
Tangent (tan θ) ↔️ Slope
The Pythagorean identity is \sin^{2} \theta + \cos^{2} \theta = 1</latex> 
True
What is the value of $\sin 30°$ using the unit circle? 
$\frac{1}{2}$
What are the key steps in solving trigonometric equations?
Isolate function, reference angles, periodicity
Arrange the steps in relating the unit circle to trigonometric functions:
1️⃣ Define the unit circle
2️⃣ Understand sine as y-coordinate
3️⃣ Understand cosine as x-coordinate
4️⃣ Understand tangent as slope
The Pythagorean identity can be used to simplify expressions such as $\sin^{2} \theta +$ $\cos^{2} \theta$ to 1. 
True
Using the Pythagorean identity, $\sin^{2} \theta +$ $\cos^{2} \theta$ can be simplified to 1. 
True
How is the general solution for $\sin \theta =$ $\alpha$ expressed using periodicity? 
$\theta =$ $\alpha +$ $2n\pi$
The amplitude of $y =$ $2\sin(2x - \pi)$ is 2. 
True
Match the trigonometric function with its ratio:
Sine (sin θ) ↔️ $\frac{\text{Opposite}}{\text{Hypotenuse}}$
Cosine (cos θ) ↔️ $\frac{\text{Adjacent}}{\text{Hypotenuse}}$
Tangent (tan θ) ↔️ $\frac{\text{Opposite}}{\text{Adjacent}}$
In the unit circle, the x-coordinate of a point at angle θ is equal to cos θ
The period of the graph y = 2sin(2x - π) is \pi
The period of the graph y = 2sin(2x - π) is \pi
At θ = 30°, sin 30° equals 1/2
What is the quotient identity for tan θ?
$\frac{\sin \theta}{\cos \theta}$
What is the quotient identity for $\tan \theta$ ? 
$\frac{\sin \theta}{\cos \theta}$
The general solution for $\sin \theta =$ $\frac{1}{2}$ includes $\theta =$ $\frac{\pi}{6} +$ $2n\pi$ . 
True
What does the y-coordinate on the unit circle represent?
$\sin \theta$
What is the purpose of trigonometric identities?
Simplify expressions