The exponential equation and approximate the result, correct to 9 decimal places. a) 3^{(4x-1)}=11 b) 6^{x+3}=3^{x} To solve for x.

permaneceerc

permaneceerc

Answered question

2021-05-26

The exponential equation and approximate the result, correct to 9 decimal places.
a) 3(4x1)=11
b) 6x+3=3x
To solve for x.

Answer & Explanation

averes8

averes8

Skilled2021-05-27Added 92 answers

Step 1
a) We have,
3(4x1)=11
Applying log to the base 10 on both sides,
log103(4x1)=log1011
 (4x3)log103=log1011
4x1=(log1011)/(log103)
4x1=log311
 x=(1/4)[(log311)+1]
 x=0.795664585
(Rounded to 9 decimals)
Identities used :
(logax)/(logay)=logyx
log ab=blog a
Step 2
b) We have,
6x+3=3x
Applying log to base 2 on both sides,
(x+3)log26=x(log23)
(x+3)log2(3×2)=x(log23)
(x+3)[(log23)+(log2)]=x(log23)
(x+3)[(log23)+1]=x(log23)
 x(log23)+3(log23)+x+3=x(log23)
log233+x+3=0
log29+x+3=0
 x=3log29
 x=6.169925001
(Rounded to 9 decimals)
Identities used :
logaxy=(logax)+(logay)
log ab=blog a

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