Rate of change word question (differentiation)
Here is a question that I am struggling with. I am not sure what it is asking me to do, bet here goes:
Let f(x)=x(1 – 2x)
a) Find the average rate of change of f(x) with respect to x as x changes from x = 0 to x = 1/2.
b) Use calculus to find the instantaneous rate of change from f(x) at x = 0 and compare with average found in part (a).
Here is how I've approached the problem:
dy/dx= average rate of change f(x)
so I find for y from the derivative of f(x)=x(1 – 2x) or f'(x)=x(1 – 2x) or y'=x(1 – 2x)
y'=x(1 – 2x)
y'=x – 2x2
y'=1– 4x
m=1/4
so then I solve for y at 0 ...
y=x(1 – 2x)
y=(0)(1 – 2(0))
y=(0)(1 – 0)
y=0
so then I solve for y at 1/2 ...
y=x(1 – 2x)
y=(1/2)(1 – 2(1/2))
y=(1/2)(1 – 1)
y=0
y-y1=m(x-x1)
y-0=m(0-1/2)
y=-1/2
Rate of change -1/2
Here is a question that I am struggling with. I am not sure what it is asking me to do, bet here goes:
Let f(x)=x(1 – 2x)
a) Find the average rate of change of f(x) with respect to x as x changes from x = 0 to x = 1/2.
b) Use calculus to find the instantaneous rate of change from f(x) at x = 0 and compare with average found in part (a).
Here is how I've approached the problem:
dy/dx= average rate of change f(x)
so I find for y from the derivative of f(x)=x(1 – 2x) or f'(x)=x(1 – 2x) or y'=x(1 – 2x)
y'=x(1 – 2x)
y'=x – 2x2
y'=1– 4x
m=1/4
so then I solve for y at 0 ...
y=x(1 – 2x)
y=(0)(1 – 2(0))
y=(0)(1 – 0)
y=0
so then I solve for y at 1/2 ...
y=x(1 – 2x)
y=(1/2)(1 – 2(1/2))
y=(1/2)(1 – 1)
y=0
y-y1=m(x-x1)
y-0=m(0-1/2)
y=-1/2
Rate of change -1/2
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