Summary - it is basic problem so I have shown step by step
solution .
1) x(2)=ln (1+a2-1) If transformation xEnJ of X(2) TIP It is di fficult to calculate the...
write each as a single logarithm 1/2ln(x2+1)-4ln1/2-1/2[ln(x-4)+ln x]
Write the expression as the logarithm of a single quantity. 1/2 ln x + 8 ln y − 9 ln z
Rewrite the expression as a single logarithm ln A. ln(8)+ 2ln(x)+ 3ln(x^2+5) A=?
find the derivative
6x<+2 ln(x), (1 point) Find the derivative with respect to x of h(x) = h'(x) =
3. (a) Write a MatLab program that calculates for the function F(x, y) = ln(x + Va,2-y2) The program should use pretty) to display both the original function and the differentiated result, and also use fprintf() to print a label such as "F(x,y) -" and "dF/dxdy - " in front of both the function and the derivative. Then have your program also print out the derivative again after it uses simplify() on the result (b) Find the Taylor expansion of...
dg (1 point) Suppose g(x) = ln(ln(ln(f(x)))), f(6) = A, and f'(6) = B. Find the derivative dx g'(6) = x=6
Problem #5 Equation 1 is the infinite Taylor series expansion of ln(1 + x), where In is the natural logarithm: 5 (-1)k+1 Eqn. 1 Σ(-1)k+1 k In(1 + x) Eqn. 2 Equation 2 is the finite version that calculates an approximation for ln(1 + x). Instead of letting k go to infinity, it stops summing once k reaches some fixed value N. Task Develop a program that can compute ln(1 +x). Have it first ask the user to enter x...
# 2,3,4,7, 10,11,15,18) Differentiate the function: #2 f(x) = ln(22 + 1) #3 f@) = ln(cos) #4 f(x) = cos(In x) #7 f(x) = log2(1 – 3x) #10 f(t) = 1+Int #11 F(x) = In( 3+1") #18 y = (ln(1 + e*)] # 23) Find an equation of the tangent line to the curve y = In(x2 – 3) at the point (2,0). # 27, 31) Use the logarithmic differentiation to find the derivative of the function. # 27 y...
Solve the following equations. 1. ln(x2 ) = ln(2x + 3) 2. log2(2) + log2(3x − 5) = 3. 3. Expand the logarithm: log ( x15y13) z19
Problem #5 Equation 1 is the infinite Taylor series expansion of ln(1 + x), where In is the natural logarithm: 5 (-1)k+1 Eqn. 1 Σ(-1)k+1 k In(1 + x) Eqn. 2 Equation 2 is the finite version that calculates an approximation for ln(1 + x). Instead of letting k go to infinity, it stops summing once k reaches some fixed value N. Task Develop a program that can compute ln(1 +x). Have it first ask the user to enter x...