solve the log equation and give the answer to four decimal places. log.(9x) = 2 -...
Use Laws of Logarithms to solve the following equations. a) Write the expression as a sum, difference or product of logs. Ipa 7 logo b) Write the expression as a single log. (log3 p – log3 9) + 2 logz r c) Solve the equation and give the answer to four decimal places. 31-2x = 4* d) Solve the log equation and give the answer to four decimal places. log(9x) = 2 – log.(x + 3)
15 all parts please! 15. Use Laws of Logarithms to solve the following equations. a) Write the expression as a sum, difference or product of logs. P9 V 7 10g6 pa b) Write the expression as a single log. (loga p-loga 9) + 2 logar c) Solve the equation and give the answer to four decimal places. 31-2x = 4* d) Solve the log equation and give the answer to four decimal places. log.(9x) = 2 - log. (x +...
Solve the following equation: r + log; (r + 4) = 3 log; Write your answers as decimals rounded to four decimal places, separated by a comma. If there is no solution, type NS. Preview
There are exercises on both sides of this page. 14. Solve the following equation: log(x - 21) = 2. e b as A - XE 15. Solve the following equation: 4* = 50. (Round your answer to three decimal places.
Solve the given equation. (Round your answer to two decimal places.) f1/2 = 0.55
a) Convert log x=t into an exponential equation. b) Convert 3-2 = into a logarithmic equation. 9 Use the change of base formula to find log; 5 to four decimal places.
Solve each equation or inequality. Round to four decimal places if necessary. 1. 272p+1= 34p-1
Solve the equation. Round your answer to three decimal places. 55) logx (89.5) = 3.6 56) 5X = 23 57) 2(x - 2) = 18 Use Cramer's rule to solve the system. 62) 4x + 3y = 26 4x + 2y = 20 Find the determinant of the given matrix, [-1-3-4 63) 5 3 5 [-5 5-1]
2) For the following equation, find an accurate value for x up to five decimal places using the Gauss iterative method. Use an initial estimate1 2x - log(r)-7 2) For the following equation, find an accurate value for x up to five decimal places using the Gauss iterative method. Use an initial estimate1 2x - log(r)-7
Answer needs to be four decimal places The error involved in making a certain measurement is a continuous rv X with the following cdf. 8x - 3 2 S x 1 (a) Compute P(X < 0) 0.5 (b) Compute P(-1< X <1). (Round your answer to four decimal places.) 0.5750 (c) Compute P(0.5 < (Round your answer to four decimal places.) 0.8515X (d) Evaluate f(x) by obtaining Fx) rx) = F'(x) =150 3 (e) Compute μ.