(a)Odd degree polynomial functions have opposite________ . (b) When we multiply two functions together, we are considering the__________ of two functions. (c) The slope of the tangent line is related to the rate of change of a function at a particular x-value. (d) All__________ functions
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(a)Odd degree polynomial functions have opposite________ .
(b) When we multiply two functions together, we are considering the__________ of two functions.
(c) The slope of the tangent line is related to the rate of change of a function at a particular x-value.
(d) All__________ functions, like sine and cosine, are__________ .
(e) A polynomial function with powers of x which are all divisible by two will be a(n) ________function.
(f) (f + g)(x) denotes a function that is the _________of two functions f(x) and g(x).
(g) Unlike the sine and cosine functions, the tangent function does not have a(n)_________ .
(h) 10x = 10000 (POWER OF X)is an exponential equation which could be solved by using the_________ logarithm.
(i) f(x) = x − 1/(x + 2)(x − 1) , is a rational function that has two restrictions on its _____________.
(j) A horizontal line is a __________, but a vertical line is not!
(k) Consider the following equation, P(x)/D(x) = Q(x)+ R/D(x) . In this equation, Q(x)is called the_______ function.
(l) Given the general form of a transformation, y = af[k(x − d)] + c , when k > 0 the function will experience a horizontal ________.
(m) The sum of two or more power functions is called a(n) _________function.
(n) The reciprocal of a linear function, y = mx + b , will have a horizontal ____________along the x-axis.
(o) A transformation of a function is an example a(n) _____________function.
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