Please use the equations to fill in the chart f(a) %3D 글m(z + 4) +3f (2) = e2-6 - 4f (x) = log(r - 2) – 8f (x) = 10%18+2f (x) = log,(x9) + 11f (2) = 2"11f (x) = e"+5 - 3f1 (x) = In(x + 3)- 5f (a) = -10"-34f (x) = log(-x - 4) +3f (x) 2-(+6) - 5f (x) = – log2( +5)-6 Pick an equation from problem #1 and its corresponding inverse. Use composition to prove that they are inverses.x Clear1 UndoA RedoProblem & Inverse from frontf(g(x))g(f(x))

Some functions are given and the inverse of the functions are also given. We have to check that…

f (x) = In(x + 4) + 3 %3D f(2) 3 e2-6- 4 %3D f (x) = log(a- 2) - 8 %3D f (x) = 108+2 ----- f (x) = log2(- 9) + 11 %3D f1 (2) 2" 11+9 f (x) = e+5 3 f'(x) = In(x+ 3) - 5 f (a) = -10"-3 %3D f (x) = log(-æ – 4) + 3 f (x) = 2-(z+6)- 5 f (x) = – log2(* + 5) – 6

f (x) = In(x + 4) + 3 %3D f(2) 3 e2-6- 4 %3D f (x) = log(a- 2) - 8 %3D f (x) = 108+2 ----- f (x) = log2(- 9) + 11 %3D f1 (2) 2" 11+9 f (x) = e+5 3 f'(x) = In(x+ 3) - 5 f (a) = -10"-3 %3D f (x) = log(-æ – 4) + 3 f (x) = 2-(z+6)- 5 f (x) = – log2(* + 5) – 6

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter5: Inverse, Exponential, And Logarithmic Functions

Section5.6: Exponential And Logarithmic Equations

Problem 45E

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Concept explainers

Vertices Of An Ellipse

In the study of the conic section of the geometry, An ellipse is a plane curve surrounding two focal points, or foci where the set of all locus of points in the plane has their sum of the distances to the two foci is constant. On the ellipse curve, it is the intersection point of the main axis. In an ellipse graph, the center of the axis is the midpoint of the line segment connecting the foci. The major axis is the line section that runs through the ellipse's foci, while the minor axis runs through the middle and is perpendicular to the major axis.. The ellipse has two endpoints on the major axis which are known as the vertices (in plural), vertex in the singular. The equation of the major axis is 2a, the equation of the minor is 2b and the distance between the major axis and minor axis is 2c. The semi-major axis has a length of a and the semi-minor axis has a length of b. The ellipse's vertices are determined by the elliptical orbit's equation and graph.

Question

Please use the equations to fill in the chart

f(a) %3D 글m(z + 4) +3
f (2) = e2-6 - 4
f (x) = log(r - 2) – 8
f (x) = 10%18+2
f (x) = log,(x
9) + 11
f (2) = 2"
11
f (x) = e"+5 - 3
f1 (x) = In(x + 3)- 5
f (a) = -10"-3
4
f (x) = log(-x - 4) +3
f (x) 2-(+6) - 5
f (x) = – log2( +5)-6

Pick an equation from problem #1 and its corresponding inverse. Use composition to prove that they are inverses.
x Clear
1 Undo
A Redo
Problem & Inverse from front
f(g(x))
g(f(x))

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