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Expand. Use * to indicate multiplication. 4 log(x) – 5 log(y) + 2 log(z))
12. Evaluate the following logarithms: logc (4) - log(9) = log (2) 13. Use log properties to expand and simplify the following logarithm as much as possible 2x log32 3z2 14. Use log properties to condense the logarithms down to a single log: In2In-n6)-In(o) 12. Evaluate the following logarithms: logc (4) - log(9) = log (2) 13. Use log properties to expand and simplify the following logarithm as much as possible 2x log32 3z2 14. Use log properties to condense...
Matrices multiplication and Partitioned multiplication: matrix X= 2 1 5 4 2 3 Matrix Y= 1 2 4 2 3 1 1. Find the XY^(T) T means transpose 2.Compute the outer product expansion of XY^(T) . 3. did you get the same answer from 1 and 2?
5. Use log differentiation to find the derivative of y = (x² + 1)*(x + 2) x(5x – x3) 10
5. Use the properties of logarithms to expand the given logarithm and simplify Assume when necessary that all quantities represent positive real numbers. In O In(5) -In(6) + .5 In(x) - In(y) +In(2) O In(5) -In(6) In(z) .5 In(3)+.5 In(2) OIn(6) -In(5) +.5 In() In(3)+.5 In(2) O In(6) In(5).5 In(z) +.5 In(y) - In(z) None of these are correct 19. Use the properties of logarithms to expand the given logarithm and simplify Assume when necessary that all quantities represent positive...
Find the Jacobian of F(x, y, z) = tan (4 x 2) In (8 x + 2) -39 y2 – 22 x + 13 y Enter your answer as a matrix. Question 4: (1 point) Find the Jacobian of F(x, y) = (21 x y + 16 32,90 22 y +38 43 a b To enter a matrix use [[a,b],[c, d]]. Do not use implicit multiplication. c d
Expand the function f(z)=log 1+Z/ 1-Z in taylor series
2. Write the expression 3 log; (2) – 2 log: (y) + { log: (z) as a single logarithm. + Question 19 please box answers ill thumbs up
4. a) Solve the equation log2 (x - 5) - log: ( x - 2) +1 algebraically. b) Verify your answers are reasonable by graphing both y = log2 (x - 5) and y = log: (x-2) +| on the same set of axes.
i need to show that Z forms a ring under new addition x+y=(x+y+1) and new multiplication x*y=x+y+xy
i need to show that Z forms a ring under new addition x+y=(x+y+1) and new multiplication x*y=x+y+xy and thanx