1) For ∠𝑋∠X, label each side as opposite, adjacent, or the hypotenuse. 2) For ∠𝑋∠X, create trigonometric ratios for sin, cos, and tan.DRAG & DROP THE ANSWERoppositeadjacenthypotenuse182430Note: Use CTRL+D to drag the option via keyboardsin(𝑋) = −sin(X) = −cos(𝑋) =− cos(X) =− tan(𝑋) = −tan(X) = −
Question
- For ∠𝑋∠X, label each side as opposite, adjacent, or the hypotenuse. 2) For ∠𝑋∠X, create trigonometric ratios for sin, cos, and tan.DRAG & DROP THE ANSWERoppositeadjacenthypotenuse182430Note: Use CTRL+D to drag the option via keyboardsin(𝑋) = −sin(X) = −cos(𝑋) =− cos(X) =− tan(𝑋) = −tan(X) = −
Solution
I'm sorry, but your question seems to be incomplete. I can't see the diagram or the triangle you're referring to. However, I can explain the general concept.
In a right triangle:
- The side opposite the right angle is called the hypotenuse.
- The side opposite to angle X is called the opposite side.
- The side next to angle X (but not the hypotenuse) is called the adjacent side.
The trigonometric ratios are defined as follows:
sin(X) = opposite/hypotenuse cos(X) = adjacent/hypotenuse tan(X) = opposite/adjacent
Please provide the specific values or the diagram for a more accurate answer.
Similar Questions
1) For ∠𝑋∠X, label each side as opposite, adjacent, or the hypotenuse. 2) For ∠𝑋∠X, create trigonometric ratios for sin, cos, and tan.DRAG & DROP THE ANSWERoppositeadjacenthypotenuse182430Note: Use CTRL+D to drag the option via keyboardsin(𝑋) = −sin(X) = −cos(𝑋) =− cos(X) =− tan(𝑋) = −tan(X) = −
Question 2From the triangle you can write the tangent ratio equation.tan35∘=oppositeadjacent=h6tan35∘=oppositeadjacent=ℎ6What would be your next line of working?
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A right triangle has side lengths d, e, and f as shown below.Use these lengths to find tanx, cosx, and sinx.xfed
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