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#1 2008-01-12 13:49:38
- tonyz1949
- Member
- Registered: 2007-08-04
- Posts: 20
Curves
1. Find the values of a and b such that the function g(x) is continuous everywhere. Justify your answer.
g(x) = 3ax - 2bx² + 1 if x > 2
2ax - 3 if x = 2
4ax³ - 5b if x < 2
2. Consider the curve given by the equation -4y³ + 3xy = -2x -14
a) Find dy/dx
b) Write an equation for the line tangent to the curve at the point where y = 1
3. Find dy/dx
a) y = 4(3x+5)cos²x
b) y = (2x+1)^(sinx)
Thanks in advance for helping me 
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#2 2008-01-13 06:05:45
- LuisRodg
- Real Member
- Registered: 2007-10-23
- Posts: 322
Re: Curves
1. For g(x) to be continuous everywhere the limit of the function from the left and from the right as x approaches c have to be the same as the function value at c. In this case c being 2. That should help you answer the first question.
2. (a) Use implicit differentiation to find dy/dx
(b) The line tangent to a function is given by y-y1 = m(x - x1), where m is the slope. They tell you the line is tangent at the point y=1 so plug it in and you will get the x value. Now you have you point (x1,y1). In part (a) u had to find dy/dx which is the derivative, plug x1 into dy/dx which will give you the slope.
3. (a) Just use chain rule.
(b) Find the derivative by using the natural log (ln) properties to get rid of the exponential sin(x).
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