Function notation

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Intros
Lessons
  1. Introduction to function notations
    Equations VS. Functions
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Examples
Lessons
  1. If f(x)=5x2x+6 f(x) = 5x^2-x+6 find the following
    1. f(){f(\heartsuit)}
    2. f(θ){f(\theta)}
    3. f(3){f(3)}
    4. f(1){f(-1)}
    5. f(3x){f(3x)}
    6. f(x){f(-x)}
    7. f(3x4){f(3x-4)}
    8. 3f(x){3f(x)}
    9. f(x)3{f(x)-3}
  2. If f(x) = 6 - 4x, find:
    1. f(3)
    2. f(-8)
    3. f(-2/5)
  3. If f(r) = 2πr2h2\pi r^2h, find f(x+2)
  4. If f(x)=x,{f(x) = \sqrt{x},} write the following in terms of the function f.{f.}
    1. x+5{\sqrt{x}+5}
    2. x+5{\sqrt{x+5}}
    3. 2x3{\sqrt{2x-3}}
    4. 8x{-8\sqrt{x}}
    5. 82x3{-8\sqrt{2x-3}}
    6. 4x5+914\sqrt{x^{5}+9}-1
  5. If f(x) = -3x + 7, solve for x if f(x) = -15
  6. The temperature below the crust of the Earth is given by C(d) = 12d + 30, where C is in Celsius and d is in km.
    i.) Find the temperature 15 km below the crust of the Earth.
    ii.) What depth has a temperature of 186 186^\circ C?