Math, asked by Eevezi, 7 months ago

Please I need the answer and solutions, ASAP Thanks I will mark as brainliest​

Attachments:

Answers

Answered by alinaafsheen
1

Answer:

log(3x+1) + log(1/2) - log(2x-5) = 0

note that log(x) is equivalent to log(10,x) which is equivalent to the log of x to the base of 10.

note also that the log function of your calculator will solve for the log of x to the base of 10 which would be shown as LOG(x).

once again, your problem is:

log(3x+1) + log(1/2) - log(2x-5) = 0

couple of properties of logarithms that will help you out.

log(x*y) = log(x) + log(y)

log(x/y) = log(x) - log(y)

once again, your problem is:

log(3x+1) + log(1/2) - log(2x-5) = 0

using the first property, you get:

log(3x+1) + log(1/2) is equivalent to:

log((3x+1)*(1/2))

your problem now becomes:

log((3x+1)*(1/2)) - log(2x-5) = 0

using the second property, you get:

log((3x+1)*(1/2)) - log(2x-5) is equivalent to:

log((3x+1)*(1/2)/(2x-5))

your problem now becomes:

log((3x+1)*(1/2)/(2x-5)) = 0

simplify the expression within the logarithm sign to get:

(3x+1)*(1/2)/(2x-5) is equivalent to:

(3x+1)/(2*(2x-5)) which is equivalent to:

(3x+1) / (4x-10)

your problem now becomes:

log((3x+1)/(4x-10)) = 0

the law of logarithms states that:

y = log(b,x) if and only if b^y = x

since the base is 10, applying this law to your problem provides the following:

log((3x+1)/(4x-10)) = 0 if and only if 10^0 = (3x+1)/(4x-10)

since 10^0 is equal to 1, your problem becomes:

1 = (3x+1)/(4x-10)

multiply both sides of this equation by (4x-10) to get:

4x-10 = 3x+1

subtract 3x from both sides of this equation and add 10 to both sides of this equation to get:

x = 11

that's you solution.

to confirm this solution is good, substitute for x in your original equation of:

log(3x+1) + log(1/2) - log(2x-5) = 0 to get:

log(3(11)+1) + log(1/2) - log(2(11)-5) = 0 which simplifies to:

log(34) + log(1/2) - log(17) = 0

use your calculator to get:

LOG(35) + LOG(1/2) - LOG(17) = 0

this results in 0 = 0 which is true, confirming the value of 11 for x is good.

Similar questions