Question

when to take sin and when to take cos in a diagram

Answer 1

Answer:

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We begin by looking at a right angled triangle where the hypotenuse has a length of 1 unit.

Opposite side = sin v°

Adjacent side = cos v°

In a right angled triangle

sin v° = opposite side/hypotenuse

and

cos v° = adjacent side/hypotenuse.

If the hypotenuse in a triangle has length 1 then it follows that

sin v° = opposite side and cos v° = adjacent side.

We now consider a circle drawn in a coordinate system.

A circle with a radius of 1 unit and it’s centre in (0, 0) is called the Unit circle.

The Unit circle

If we draw a radius that makes an angle of v° with the positive arm of the x axis and drop a perpendicular as the diagram shows we get a right angled triangle with sides of length cosv° and sin v°. This means that the coordinates of the point where the radius intersects the circle must be (cos v°, sin v°).

Now we’ll look at tan v° a similar way

Answer 2

Answer:

sin must take when we have to find opposite side and hypothenous side relation.

cos must take when we have to find a adjacent side and hypothenous side relation.