Logarithmic Functions As Inverses Worksheet at Ellie Ridley blog

Logarithmic Functions As Inverses Worksheet. Since the exponential and logarithm functions are inverses we can use the same methods in the previous worksheet to nd inverses. Find the inverse of each function: The inverse of an exponential. To find an inverse algebraically, you switch x and y first, then solve for y. Find the inverse of each function. 1) log (u2 v) 3 2) log 6 (u4v4) 3) log 5 3 8 ⋅ 7 ⋅ 11 4) log 4 (u6v5) 5) log 3 (x4 y) 3 condense each expression to a single logarithm. Find the inverse of each of the following functions. When the inverse of a function, f, is also a function, we say that f is invertible. (1) f(x) = log 2 (x 3) 5 (2) f(x) = 3log 3 (x+3)+1 (3) f(x) = 2log2(x 1)+2 (4) f(x) = ln(1 2x)+1. Students would work through problems involving exponential functions and then apply logarithms to solve them.

Find the inverse of each function. When the inverse of a function, f, is also a function, we say that f is invertible. Students would work through problems involving exponential functions and then apply logarithms to solve them. Since the exponential and logarithm functions are inverses we can use the same methods in the previous worksheet to nd inverses. Find the inverse of each of the following functions. Find the inverse of each function: To find an inverse algebraically, you switch x and y first, then solve for y. The inverse of an exponential. (1) f(x) = log 2 (x 3) 5 (2) f(x) = 3log 3 (x+3)+1 (3) f(x) = 2log2(x 1)+2 (4) f(x) = ln(1 2x)+1. 1) log (u2 v) 3 2) log 6 (u4v4) 3) log 5 3 8 ⋅ 7 ⋅ 11 4) log 4 (u6v5) 5) log 3 (x4 y) 3 condense each expression to a single logarithm.

Solving Logarithmic Equations Worksheet

Logarithmic Functions As Inverses Worksheet When the inverse of a function, f, is also a function, we say that f is invertible. To find an inverse algebraically, you switch x and y first, then solve for y. Find the inverse of each of the following functions. The inverse of an exponential. 1) log (u2 v) 3 2) log 6 (u4v4) 3) log 5 3 8 ⋅ 7 ⋅ 11 4) log 4 (u6v5) 5) log 3 (x4 y) 3 condense each expression to a single logarithm. Students would work through problems involving exponential functions and then apply logarithms to solve them. Find the inverse of each function. When the inverse of a function, f, is also a function, we say that f is invertible. Since the exponential and logarithm functions are inverses we can use the same methods in the previous worksheet to nd inverses. (1) f(x) = log 2 (x 3) 5 (2) f(x) = 3log 3 (x+3)+1 (3) f(x) = 2log2(x 1)+2 (4) f(x) = ln(1 2x)+1. Find the inverse of each function: