Let f be a real-valued function of two variables (x, y) that is defined on the square q = {(x, y) i 0 ~ x ~ i, 0 ~ y ~ i} and is a measurable function of x for each fixed value of y. for each (x, y) e q let the partial derivative a f / ay exist. suppose there is a function g that is integrable over [0, 1] and such that i~~(x, y)1 ~g(x)forall(x, y)eq. prove that

translate k to n and reflect across the line containing jk.

3. (5x + 1) - (-10x + 6)

simplify the answer choice. combine like terms. remember to distribute the negative to the terms inside the second parenthesis. also remember that two negatives = one positive, and one of each sign = negative.

- (-10x + 6) = + 10x - 6

simplify. combine like terms:

5x + 1 + 10x - 6

5x + 10x + 1 - 6

15x - 5

∴ it is your answer

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you didn't post any answer choices, so its not 100% clear what your teacher is looking for

however, log(15/7) is equivalent to log(15) - log(7)

i'm using the rule log(x/y) = log(x) - log(y)