Algebra
All exponential functions have as domain the set of real numbers because the domain is the set of numbers that can enter the function and enable to produce a number as output. In exponential functions whatever real number can be operated. (-infinity, infinity)
You have ln (x+4) so everything is shifted by 4. The domain of ln (x+4) is now -4 < x < infinity (Shifting infinity by a finite number gives you infinity again.) So,-4 < x < infinity is the domain of ln (x+4).
(2 [less than] t [less than] infinity)
For your function f (t) = 5.5exp (t) the function is continuous for all values of t as exp (t) is continuous for all values t, i.e. The domain of the function is -oo < t < oo
2a. subtracting 3 on the inside the function moves it 3 units to the right, that's the only transformation.
the vertical asymptote results from an invalid input to the function, like dividing by zero or taking the square root of a negative number, or in this case, taking the log of zero. so we need to find the value where x-3=0, thus the asymptote occurs at x=3. The x intercept is when y (or g (x) in this case)=0-0=g (x)=log (x-3) log (x-3)=0 x-3=10^0 x-3=1 x=4 so the intercept is at (4,0)
2b. We see that the right side of g (x), which is -log (x), is the result of multiplying the right side of f (x) by -1, so by rule 5, the graph of g (x) is the graph of f (x) reflected across the x-axis.
Flipped over the x-axis;
horizontal asymptote y=0
no x-intercept
3a. The principal amount (P) is 3000, since that is what was originally deposited.
The rate (r) is 0.06 because 6% means 6/100.
The number (n) that it is compounded is 1, since annually means only once a year.
The time (t) is 9 years; Therefore when plugged into the equation, the return is $5,068.44
3b. We can just plug in the numbers. P, r, and t are the same, but now n changes from 1 to 4. As a result, the return comes out to be $5,127.42
3c. Compounding quarterly yields more interest. This is because when we do it once a year, it only multiplies the whole thing once by 1.06. When we do it four times a year, it multiplies it by 1.015^4, which is 1.06136355, which is actually more than 1.06.
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