True or False: Indicate whether the statement is true or false 11. If y = 3*, then x = logз y 12. You can write log254 as 4log25 13. The y-intercept for all exponential functions is 1 14. The y-intercept of the exponential function f(x) = 6* is 1 15. The graph of ƒ (x) = log (x − 4) has a vertical asymptote at x = -4 16. If ƒ−1(x) = 5*, then f(x) = log5* 17. The transformation applied to f(x) = log(x + 3) - 4 is translated 3 left and 4 down 18. Logarithmic functions are defined only for positive values of the base that are not equal to 1 19. All exponential functions have vertical asymptotes log4 20. You can write log4 21 as log21
True or False: Indicate whether the statement is true or false 11. If y = 3*, then x = logз y 12. You can write log254 as 4log25 13. The y-intercept for all exponential functions is 1 14. The y-intercept of the exponential function f(x) = 6* is 1 15. The graph of ƒ (x) = log (x − 4) has a vertical asymptote at x = -4 16. If ƒ−1(x) = 5*, then f(x) = log5* 17. The transformation applied to f(x) = log(x + 3) - 4 is translated 3 left and 4 down 18. Logarithmic functions are defined only for positive values of the base that are not equal to 1 19. All exponential functions have vertical asymptotes log4 20. You can write log4 21 as log21
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Transcribed Image Text:True or False: Indicate whether the statement is true or false
11. If y = 3*, then x =
logз y
12. You can write log254 as 4log25
13. The y-intercept for all exponential functions is 1
14. The y-intercept of the exponential function f(x) = 6* is 1
15. The graph of ƒ (x) = log (x − 4) has a vertical asymptote at x = -4
16. If ƒ−1(x) = 5*, then f(x) = log5*
17. The transformation applied to f(x) = log(x + 3) - 4 is translated 3 left and 4 down
18. Logarithmic functions are defined only for positive values of the base that are not equal to 1
19. All exponential functions have vertical asymptotes
log4
20. You can write log4 21 as
log21
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