The car reader for miles gained 824.8 miles after the road trip
Answer:
The answer is ""
Step-by-step explanation:
Please find the graph file of the question in the attachment.
Its first step is the lightest and heaviest evil. is the lightest bag, and is the heaviest bag. To remove it now, it is not permissible to remove it as a mixed fraction, therefore convert each fraction into an improper fraction by multiplying the whole integer to the numerator, then adding a numerator to this amount, multiplied by the numerator. Follow those steps to find out is the wrong part.
The process is the same for
You now deduce the numerator but just not the negative, to deduct both. You subtract, as the question is raised far as is involved. The last stage is that this is transformed into blended families, dividing its count by the denominator, 6 divided by 4 is identical to 1.5. 1 is a full amount so you don't modify it, but you do need to change the 5 decimals to and the last step is to reduce.
Answer:
x = -2
Step-by-step explanation:
We are given the logarithmic base 2 equation of:
Apply logarithm property of addition where:
Therefore, we will write new equation as:
Apply logarithm to exponential form using:
Thus, another new rewritten equation is:
Expand the expression in and arrange the terms in quadratic expression:
Solve for x:
These are potential solutions to the equation. To find extraneous solution, you’ll have to know the domain of logarithm function. We know that logarithm’s domain is defined to be greater than 0. Henceforth, anti-logarithm must be greater than 0.
( 1 ) 4x > 0, x > 0
( 2 ) x + 1 > 0, x > -1
Therefore, our anti-log must be greater than 0, so any solutions that are equal or less than 0 will be considered as extraneous solution.
Hence, x = -2 is the extraneous solution.
Answer:
60
Step-by-step explanation:
12=2⋅2⋅3
15=3⋅5
We see that they both share 3 is their LCM.
We divide each number by their LCM.
123⇒4
153⇒5
We multiply these two quotients and the LCM to get our final answer:
3⋅4⋅5=60
That is our answer!
Hope this helped! :)