Asked by reiya
Given the following graph of y = cos(θ+π/2) from 0 ≤ θ ≤ 2π:
a) For what value(s) of θ does the instantaneous rate
of change appear to equal 0?
b)For what value(s) of θ does the instantaneous rate
of change reach its maximum? Its minimum?
a) For what value(s) of θ does the instantaneous rate
of change appear to equal 0?
b)For what value(s) of θ does the instantaneous rate
of change reach its maximum? Its minimum?
Answers
Answered by
oobleck
note that cos(θ+π/2) = -sinθ
(a) the max/min occur when -sinθ = ±1. Where does that happen?
(b) the slope is steepest when -sinθ = 0. Where's that?
Just look at the graph to confirm your choices.
(a) the max/min occur when -sinθ = ±1. Where does that happen?
(b) the slope is steepest when -sinθ = 0. Where's that?
Just look at the graph to confirm your choices.
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