Solve for x and y in the following expressions:
0.67 = log(x)
0.67 = ln(y)
Solve for x and y in the following expressions: 0.67 = log(x) 0.67 = ln(y)
step by step 7) (10 pts) Solve for x and y in the following expressions: (a) 0.38 log (x) (b) 0.38 In (y)
ln (k2/0.012365) = -0.803497594 ln is natural log. solve for k2
Solve differential equation. (x/y) (dx/dy) +(ln(y) - x) =0 I have been told it is not solved by substitution. It doesn't look exact or separable. It appears to be linear, but the mixed variable for qx and the natural log is confusing to me.
Solve for x: 8^x=30 a) x= log^8 30 b) x= log^30 8 c) x= log(8) d) x= ln(8) e) x= log(30)
Solve the following Utility Maximization Problem for x* and y* that Max U(x,y)= ln(x) subject to Pxx + pyy = I ----.-.(2) where In denotes the natural logarithm (base e) and x and y>0. a) (25 points) by Substitution and show that your values of x* and y* max U (x*,y*). Problem 1. b) (20 points) by the Lagrange Multiplier Method
Solve by using Cramer’s Rule 4 e x – 6 tan( y ) + 2 ln(z) = 1 3 e x + 5 tan( y ) – 3 ln(z) = 2 e x + 5 tan( y ) + 4 ln(z) = 5
Solve differential equation y'' = -(y')^2 - y + ln(x) with boundary conditions y(1) = 0 and y(2) = ln2. I know that the answer is y = ln(x) but don't know how to get started.
let u= ln(x) and v=ln(y) w=ln(z) where x,y,z>0 .Write thr following wxpressiins in terms of u,v, and w. a) ln( squareroot x^5)/ y^3z^2) B) ln (squareroot x^3 4squaroot y)
Solve the following logarithmic equation. log 5(x + 23) = 5 - log 5(X+ 123) Solve the equation. 32-x+ 22 = 64%
Solve the following equations. 1. ln(x2 ) = ln(2x + 3) 2. log2(2) + log2(3x − 5) = 3. 3. Expand the logarithm: log ( x15y13) z19