Understanding Secant, Cosecant, and Cotangent - Math

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An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

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The problem tells us that the cosine of the angle will be $\frac{4}{5}$ . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem:

Now we know our opposite, adjacent, and hypotenuse.

The cosecant is $\csc=\frac{\text{Hypotenuse}$}{$\text{Opposite}$}$ .

From here we can plug in our given values.

$\csc=\frac{5}{3}$$

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

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$\sec{x}=\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ , as it is the inverse of the $\cos{x}$ function. This is therefore the answer.

An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

Tap to see back →

The problem tells us that the cosine of the angle will be $\frac{4}{5}$ . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem:

Now we know our opposite, adjacent, and hypotenuse.

The cosecant is $\csc=\frac{\text{Hypotenuse}$}{$\text{Opposite}$}$ .

From here we can plug in our given values.

$\csc=\frac{5}{3}$$

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

Tap to see back →

$\sec{x}=\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ , as it is the inverse of the $\cos{x}$ function. This is therefore the answer.

An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

Tap to see back →

The problem tells us that the cosine of the angle will be $\frac{4}{5}$ . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem:

Now we know our opposite, adjacent, and hypotenuse.

The cosecant is $\csc=\frac{\text{Hypotenuse}$}{$\text{Opposite}$}$ .

From here we can plug in our given values.

$\csc=\frac{5}{3}$$

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

Tap to see back →

$\sec{x}=\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ , as it is the inverse of the $\cos{x}$ function. This is therefore the answer.

An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

Tap to see back →

The problem tells us that the cosine of the angle will be $\frac{4}{5}$ . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem:

Now we know our opposite, adjacent, and hypotenuse.

The cosecant is $\csc=\frac{\text{Hypotenuse}$}{$\text{Opposite}$}$ .

From here we can plug in our given values.

$\csc=\frac{5}{3}$$

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

Tap to see back →

Understanding Secant, Cosecant, and Cotangent - Math

An angle has a cosine of . What will its cosecant be?

The problem tells us that the cosine of the angle will be . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem: Now we know our opposite, adjacent, and hypotenuse. The cosecant is . From here we can plug in our given values.

Which of these is equal to for angle ?

, as it is the inverse of the function. This is therefore the answer.

An angle has a cosine of . What will its cosecant be?

The problem tells us that the cosine of the angle will be . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem: Now we know our opposite, adjacent, and hypotenuse. The cosecant is . From here we can plug in our given values.

Which of these is equal to for angle ?

, as it is the inverse of the function. This is therefore the answer.

An angle has a cosine of . What will its cosecant be?

The problem tells us that the cosine of the angle will be . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem: Now we know our opposite, adjacent, and hypotenuse. The cosecant is . From here we can plug in our given values.

Which of these is equal to for angle ?

, as it is the inverse of the function. This is therefore the answer.

An angle has a cosine of . What will its cosecant be?

The problem tells us that the cosine of the angle will be . Cosine is the adjacent over the hypotenuse. From here we can use the Pythaogrean theorem: Now we know our opposite, adjacent, and hypotenuse. The cosecant is . From here we can plug in our given values.

Which of these is equal to for angle ?

, as it is the inverse of the function. This is therefore the answer.

An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

$\sec{x}=\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ , as it is the inverse of the $\cos{x}$ function. This is therefore the answer.

An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

$\sec{x}=\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ , as it is the inverse of the $\cos{x}$ function. This is therefore the answer.

An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

$\sec{x}=\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ , as it is the inverse of the $\cos{x}$ function. This is therefore the answer.

An angle has a cosine of $\frac{4}{5}$ . What will its cosecant be?

Which of these is equal to $$\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ for angle ?

$\sec{x}=\frac{\text{hypotenuse}$}{$\text{adjacent}$}$ , as it is the inverse of the $\cos{x}$ function. This is therefore the answer.