Use the change of base forumla to approximate log4 20 to the neareset thousandth.
Use the change-of-base formula to approximate the logarithm accurate to the nearest ten-thousandth. 1097 6 á
5 of 20 Solve the equation and express the solution in exact form. log4(x + 2) -a. log4(x - 2) = 2, where a= -1. 1275) {8} (+2/5)
Approximate the point of intersection of the graphs of fand g. (x, y) = ( ) 20 40 60 80 Solve the equation f(x) = g(x) algebraically to verify your approximation. f(x) = log4 * g(x) = 3 (x, y) =(
Use differentials to approximate the change in cost corresponding to an increase in sales (or production) of one unit. Then compare this with the actual change in cost. (Round your answers to two decimal places.) Function x-Value C = 0.075x2 + 6x + 7 X = 10 dollars dc = AC = dollars Need Help? Raadi Wis This to a Tutor 2. (-/2 Points] DETAILS LARAPCALC10 3.8.016. MY NOTES PRACTICE ANOTHER Use differentials to approximate the change in revenue corresponding...
Use differentials to approximate the change in profit corresponding to an increase in sales (or production) of one unit. Then compare this with the actual chang in profit. Function x-Value P=-0.2x2 + 200x - 80 X = 40 dp = dollars AP = dollars Need Help? Read it Watch Tak to a Tutor 4. [1/2 Points) DETAILS PREVIOUS ANSWERS LARAPCALC10 3.8.034. MY NOTES PRACTICE ANOTHER The revenue R for a company selling x units is R = 800x - 0.1x?...
x =-1 ent x= 2.19615 322 x= 2.20 6. Use the change of base formula to approximate the logarithms to four decimal places. Show the logarithmic ratio (fraction) used for your calculations. a) log35 b) log-0.251 c) log, d) log1 7. Solve the logarithmic equation. logs(3t+2) - logst = logs 4
Within the image what is the approximate size (number of base pairs) of the DNA Bands? I was thinking approximately 30 would this be correct? Thanks 150 base pairs → 100 base pairs → 75 base pairs → 50 base pairs> 40 base pairs-> 20 base pairs →
Let y = 2(19 - 5x)/2 Use differentials to approximate change in y if a changes from 3 to 3.02. (A) 0.24 (B) -0.25 (C) -0.6 (D) 1.8 (E) - 1.2
Use the change of base rule to find the logarithm to four decimal places. (9 is the base of the logarithm) 17) log, 2
Each function f(x) changes value when x changes from x0 to x0 + dx. Find the change Δ.fX0 + dx)-foo), the value of the estimate df- The change Δ-1.902 (Round to the nearest thousandth.) r (%) d, and the approximate error la-dfl. The value of the estimate df f(x)-6x-4, X,--1.1 , dx=0.1 (Round to the nearest thousandth.) dx Tangent 0 to Each function f(x) changes value when x changes from x0 to x0 + dx. Find the change Δ.fX0 +...