dx 15. Findſ A. -5 ln|5e¬× + 1| + C 5+ex C. 5 In|5e¬* + 1|+ C -x B. - In|5e-* + 1|+C D.을 In15e-* + 1| + C 16. The integral of ſ y²+1 dyis equal to y3+3y A. In+C C. In(y³ +3y) + C y 3 y3+3y В. 3 In ²+3 + C y D.를 n(y3 + 3y) + C
dx 15. Findſ A. -5 ln|5e¬× + 1| + C 5+ex C. 5 In|5e¬* + 1|+ C -x B. - In|5e-* + 1|+C D.을 In15e-* + 1| + C 16. The integral of ſ y²+1 dyis equal to y3+3y A. In+C C. In(y³ +3y) + C y 3 y3+3y В. 3 In ²+3 + C y D.를 n(y3 + 3y) + C
Chapter6: Exponential And Logarithmic Functions
Section6.7: Exponential And Logarithmic Models
Problem 27SE: Prove that bx=exln(b) for positive b1 .
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Transcribed Image Text:dx
15. Findſ
A. -5 ln|5e¬× + 1| + C
5+ex
C. 5 In|5e¬* + 1|+ C
B. - In|5e=* + 1|+ C
.=In|5e=* + 1| + C
16. The integral of ſ
y²+1
dyis equal to
y3+3y
C. In(y³ +3y) + C
D. In(y3 + 3y) + C
A. In+C
y
3
y3+3y
В.
3
In +3
+ C
y
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