Chapter Three: Exponential and Logarithmic Functions Flashcards
a function has an inverse if and only if
it is a one-to-one function, and therefore passes the horizontal line test
the inverse of a function is a reflection over the line
y = x
to verify that two functions are inverses of each other
f ° f-1(x) = x
AND
f-1 ° f(x) = x
exponential function
y = bx, where b > 1 or 0 < b < 1
what are the conditions of an exponential function?
- the base must be a positive real number that DOES NOT equal 1
- the exponent must include a variable
- the exponent can be positive, negative, fractional, or a radical
negative power rule
A-n = (1/A)n = 1/An
power of a power rule
(An)m = Anm
fractional power rule
Am/n = n√Am = (n√A)m
describe the graph of a standard exponential function, where b is greater than one
- the y-intercept is 1 unless the graph has been shifted
- the negative x-axis is a horizontal asymptote
- the function will never be negative (again, unless it has been shifted)
- as b increases, the function on the left will increase more slowly, and the function on the right will increase more quickly
what happens when to the graph of an exponential function when the base of the exponential function is a fraction?
the curve is reflected across the y-axis
note: be sure that it is not an improper fraction, as this only holds true when 0 < b < 1
what is e?
- equal to 2.71828169
- to estimate e, use the formula ( 1 + 1/n)n
- the base whose tangent line at (0, 1), or wherever x = 0 has a slop of m = 1
what is the compound interest formula? (a.k.a the interest rate formula or present and future value formula)
A = P( 1 + r/m)mt
a logarithm is
the inverse function of an exponential function
logarithm to exponential formula
y = logbx <=> by = x
tip: b to what exponent equals x?
you can never take the log of
a negative number
what are the properties of the graph of a logarithmic function?
- x will always be positive
- the function is asymptotic to the negative y axis
- inverse of exponential graph
- the higher the base, the slower the increase above the x-axis, and the faster the increase below the x-axis (towards the asymptote)
a fractional base of a logarithm will affect the graph by
creating a reflection over the x-axis
property of logs: when the base and x are the same number
logbb = 1
property of logs: when x equals 1
logb1 = 0
property of logs: multiplying two numbers in the argument of a log, or adding two logs
logb(xy) = logbx + logby
property of logs: dividing two logs in the argument, or subtracting two logs
logb(x/y) = logbx - logby
note: this is NOT a quotient of two logs, but the log of a quotient
property of logs: the log of a number raised to a power
logb(xy) = ylogbx
the natural log
logex = lnx
the change of base theorem
logbx = (logax)/(logab)
a can be any number
