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#1 2021-06-08 00:58:10
- simonmagusflies
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- Registered: 2021-05-23
- Posts: 32
Can't wrap my dumb head around this angles problem
An angle "p" exists that is complementary to angle g on one side. On the other side, the angle p is supplementary to angle h. The sum of the three angles is 200°. What is the measure of this common angle p? (Show your work AND upload a drawing of this problem.)
So, p + g = 90
p + h = 180
p + g + h = 200?
Where in the world do I start with this? And the drawing? Aggghhh. I'm really not good with angles.
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#2 2021-06-08 01:56:13
- Bob
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- Registered: 2010-06-20
- Posts: 10,626
Re: Can't wrap my dumb head around this angles problem
Hi, Your three equations are correct, so this ceases to be an angles question and becomes an algebraic one.
Add together the first two (2p + g + h) and subtract the third to get p.
Bob
Children are not defined by school ...........The Fonz
You cannot teach a man anything; you can only help him find it within himself..........Galileo Galilei
Sometimes I deliberately make mistakes, just to test you! …………….Bob 
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#3 2021-06-08 12:28:19
- nycmathguy
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- Registered: 2021-06-02
- Posts: 53
Re: Can't wrap my dumb head around this angles problem
Hi, Your three equations are correct, so this ceases to be an angles question and becomes an algebraic one.
Add together the first two (2p + g + h) and subtract the third to get p.Bob
Is this not three equations in 3 unknowns?
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#4 2021-06-08 14:50:01
- simonmagusflies
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- Registered: 2021-05-23
- Posts: 32
Re: Can't wrap my dumb head around this angles problem
Hi, Your three equations are correct, so this ceases to be an angles question and becomes an algebraic one.
Add together the first two (2p + g + h) and subtract the third to get p.Bob
Hello, thanks for replying. I just can't wrap my head around that. What am I supposed to do?? (@_@)
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#5 2021-06-08 15:30:06
- simonmagusflies
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- Registered: 2021-05-23
- Posts: 32
Re: Can't wrap my dumb head around this angles problem
Nevermind, I think I've got it. P = 70?
You can do p + (90 - p) + (180 - p) = 200, remove the brackets, combine the "p"s, multiply negatives in, which leaves me with p = -200 + 90 + 18. So, that means p = 70?
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#6 2021-06-08 19:42:38
- Bob
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Re: Can't wrap my dumb head around this angles problem
hi simonmagusflies
p = 70 is what I got too.
Your algebra is excellent and probably simpler than mine. Just for the record here's what I did:
p+g = 90
p+h = 180
so 2p + g + h = 270
we are told P + g + h = 200 so subtracting one equation from the other gives
p = 70
But my first approach was to make a diagram.
I started by drawing a right angle, ACD
Then I split this into angle g and angle p by marking the line BC.
I extended AC to E so that ACE is a straight line and angle ACE = 180.
I extended BC to F so that BCF is a straight line and angle BCF = 180.
I marked on angle h = DCF
angle ECF = angle ACB = g (vertically opposite angles)
Reflex angle ACF is given as 200 and angle ACE = 180 therefore g = 20.
So p = 70
Bob
Children are not defined by school ...........The Fonz
You cannot teach a man anything; you can only help him find it within himself..........Galileo Galilei
Sometimes I deliberately make mistakes, just to test you! …………….Bob
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