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This variable is commonly used to represent the "inside function".
What is u?
Point, Jump, Infinite
What are the three types of discontinuity?
Coordinates can also be represented by the following trigonometric functions
What are cos(x) and sin(x)?
If f(2) = 1 then ______ (in terms of g).
What is g(1) = 2?
Derivative of 4x² - 8x + 83
What is 8x - 8?
In Lagrange Notation, the formula for the chain rule is ______.
What is f'(g(x)) · g'(x)?
If f is continuous at x = c, it is not guaranteed that f is _____ at x = c
What is differentiable?
A trick that can be used anywhere to help remember coordinates
What is the hand trick?
Derivative of f-1(x)
What is 1/f'(g(x))
Derivative of sin²(x)
What is 2sin(x)cos(x)?
Apply the chain rule to eu
What is eu · u'?
If f is continuous on the closed interval [a,b] and k is any number between f(a) and f(b), there is at least one number c in [a,b] such that f(c) = k.
What is the Intermediate Value Theorem?
sin(60)
What is √3/2?
Derivative of sin-1(x)
What is 1/√ (1-x2)?
Second derivative of 7x⁴ + 9x³ - (8x² + 2x)
What is 84x²+54x-16?
Derivative of tan²(x)
What is 2tan(x)sec²(x)?
If h(x) < f(x) < g(x) for all x values in an open interval containing c, except at c itself, and if limx→c h(x) = L = limx→c g(x), then limx→c f(x) exists and is equal to to L
What is the Squeeze Theorem?
Half the circumference
What is pi?
Derivative of arctan(x)
What is 1/(1+x²)
Derivative of y² + 2xy = 3x² at the point (1, -3)
What is -3?
Derivative of cot⁴(x)
What is -4cot³(x)csc²(x)?
If r > 0 is a rational number, such that xr is defined for all x values, then limx→-∞ 1/xr = 0 and limx→∞ 1/xr = 0
What is the Limit at Infinity Theorem?
Radian at 495°
What is 3π/4?
Derivative of cot-1(5x²-2x)
What is -(10x-2)/((5x²-2)²+1)?
Derivative of cos⁴(3x²+5)
What is -24xcos³(3x²+5)sin(3x²+5)?