Warmup 12/1/15 How well do you relate to other people? What do you think is the key to a successful...
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Transcript of Warmup 12/1/15 How well do you relate to other people? What do you think is the key to a successful...
Warmup 12/1/15
How well do you relate to other people? What do you think is the key to a successful friendship?
To summarize differentials up to this point
pp 256: 5, 7, 9, 15Objective Tonight’s Homework
Homework HelpLet’s spend the first 10 minutes of class going over any problems with which you need help.
Notes on Proving Trigonometric DerivativesWe’ve talked about trig derivatives before:
d/dx sin(x) = cos(x)d/dx cos(x) = -sin(x)d/dx tan(x) = sec2(x)
Notes on Proving Trigonometric DerivativesWe’ve talked about trig derivatives before:
d/dx sin(x) = cos(x)d/dx cos(x) = -sin(x)d/dx tan(x) = sec2(x)
But how do we prove these?
Notes on Proving Trigonometric DerivativesWe’ve talked about trig derivatives before:
d/dx sin(x) = cos(x)d/dx cos(x) = -sin(x)d/dx tan(x) = sec2(x)
But how do we prove these?Let’s start by proving d/dx cos(x) = -sin(x)
We’re going to do this by assuming that d/dx sin(x) = cos(x)
We also will use the idea that cos(x)=sin(π/2-x)
Notes on Proving Trigonometric DerivativesKnowing all this, try to prove that: d/dx cos(x) = -sin(x)
Notes on Proving Trigonometric DerivativesKnowing all this, try to prove that: d/dx cos(x) = -sin(x)
y = cos (x) start functiony = sin(π/2-x) Other angle substitution
u = π/2-x U definitiondu = -1 dx implicit differentiation
y = sin(u) U substitutiondy = cos(u) du implicit differentiationdy = cos(π/2-x)(-1) dx substitution backdy = sin(x)(-1) dx Other angle substitutiondy/dx = -sin(x) Rearranging π/2-x
Notes on Proving Trigonometric DerivativesWe’ve now seen quite a number of rules. The rest of this section goes over much the same.
There is a table on page 255 of your book. Copy this table down in your notes
Group PracticeLook at the example problems on pages 253 through 255. Make sure the examples make sense. Work through them with a friend.
Then look at the homework tonight and see if there are any problems you think will be hard. Now is the time to ask a friend or the teacher for help!
pp 256: 5, 7, 9, 15
Exit Question
Does a function like Arcsin(x) have an integral?
a) Yesb) Yes, but not at all valuesc) Nod) Not enough informatione) None of the above