Ack! Tangents? Cosines? Sines? What is this stuff?!

NonMathLover · 2008-11-21 14:05:35

Hey you guys; I need some help on this hw problem...see, we're learning about tangents & cosines & stuff; but I am not grasping it *I was homeschooled last year, & I did ALGEBRA not this geometry, LOL!* so, I am trying to understand it easier.
Any help is appreciated.

Here's the problem:
It says 'Find the length of the missing side labeled x. Show your work.

Here's the pic of the problem, as I can't draw triangles on here very well:

Do you do a2+b2= C2?
or C2= a2+b2? Eh! & how do you convert the degrees or tell if it's a cosine, tangent or sine or not?
Thanks!

Jai Ganesh · 2008-11-21 18:57:22

The Sine rule would be useful here:

You know angle at R is 90° and the length of the side opposite it has to be found.
But then you also know angle r is 54° and the side opposite it is 4.5 cm.

Apply the formula, and you'd get the solution.

John E. Franklin · 2008-11-21 19:07:12

The sine on calculator of 54 degrees, make sure calculator is in D, not R or G mode, if entering 54 degrees, D for degrees, R for Radians.
So either do COSine 36 degrees or do SINe 54 degrees, both are the
same thing. Then set that result equal to (4.5 cm / x).

Last edited by John E. Franklin (2008-11-21 19:08:49)

mathsyperson · 2008-11-21 23:44:25

Ganesh's formula is more usually used in triangles that don't have a right-angle.
It still works here, but you'd normally go with SOHCAHTOA.

This time, SOH is used because the two sides involved are the one Opposite your angle, and the Hypotenuse.

So sin 54 = Opposite/Hypotenuse = 4.5/x, which is what John said.

From there, rearrange and solve for x.

NonMathLover · 2008-11-22 07:53:56

Okay, I'll try that. Thanks you guys!

NonMathLover · 2008-11-22 10:28:38

Sorry to double-post, but I think I am getting it more now.
However, how do I set it up? Do I do .8090/4.5? or 4.5/.8090? Eh!

Last edited by NonMathLover (2008-11-22 10:30:16)

mathsyperson · 2008-11-22 10:46:32

From above we had that sin 54 = 4.5/x.

Now multiply by x:
x sin 54 = 4.5

And divide by sin 54:
x = 4.5/sin 54 = 4.5/0.809... ≈ 5.6 cm

A useful thing to remember is that the hypotenuse (the side that doesn't touch the right-angle) is always the longest of the three sides.
If you'd got an answer that was less than 4.5, then you'd know that something had gone wrong.

NonMathLover · 2008-11-23 08:52:45

Okay, thanks! That really helped.

Iv'egotit!Ithink · 2009-05-18 19:10:58

I'm having trouble understanding why I'm getting the wrong answer!
Can someone explain why?
Evaluate the six trigonometric functions of the angle x

The book says the answer is sqrt5/5 , but don't understand why.

|=
5 | =
|-- =
|_|____x_
10

mathsyperson · 2009-05-19 06:44:48

5√5 is the length of the hypotenuse of that triangle, because √(5² + 10²) = √(125) = 5√5.

That's not the answer, but it is required information to find the answer.

To find the 6 trigonometric functions of x, just use SOHCAHTOA to find sin, cos and tan.
(This is easy now that you know all three side lengths)

Then divide 1 by each of those to get cosec, sec and cot respectively.

Math Is Fun Forum

#1 2008-11-21 14:05:35

Ack! Tangents? Cosines? Sines? What is this stuff?!

#2 2008-11-21 18:57:22

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#3 2008-11-21 19:07:12

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#4 2008-11-21 23:44:25

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#5 2008-11-22 07:53:56

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#6 2008-11-22 10:28:38

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#7 2008-11-22 10:46:32

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#8 2008-11-23 08:52:45

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#9 2009-05-18 19:10:58

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

#10 2009-05-19 06:44:48

Re: Ack! Tangents? Cosines? Sines? What is this stuff?!

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