1. (a) For the relation. xe^y= x^-1 ln(y^2 +1)-arcsec x taking the derivative of both sides...

Implicit derivative 1 Find y’(x) from F(x,y) =2^(-x -y) *ln(3*x +3*y) -x -y +(x+y)^3 =20 at...

Implicit derivative 1 Find y’(x) from F(x,y) =2^(-x -y) *ln(3*x +3*y) -x -y +(x+y)^3 =20 at (x,y)=(1, 1.824). Write y’(1) at this point as a number in decimal notation with at least two digits after the decimal point. No fractions, spaces or other symbols. Hint: the simple solution does not even require taking derivatives.

1). Find the derivative of the function. y= 3ln(x+6)/2-6x 2). Find the derivative. y= e^x^5 ln...

1). Find the derivative of the function. y= 3ln(x+6)/2-6x 2). Find the derivative. y= e^x^5 ln x

I need to find dy/dx if y = pi^x(ln(sqrt(tanx)) I get y' = pi^xln(pi)(ln(sqrt(tanx))+pi^xsec^2x/2tanx However, I...

I need to find dy/dx if y = pi^x(ln(sqrt(tanx)) I get y' = pi^xln(pi)(ln(sqrt(tanx))+pi^xsec^2x/2tanx However, I still have a 1/y on the left hand side and I'm not sure if you multiply both sides by y to solve for y'.

Find the derivative of the following functions: Y = 10X3 – 20X2 + 10X -5 Y...

Find the derivative of the following functions: Y = 10X3 – 20X2 + 10X -5 Y = 23X5 -120X2    (10 points) Rules for taking derivatives are found on p. 103 Most economic derivative equations can found using the first three rules so I will briefly note those. Constant Rule – any term that does not include a variable does not vary and has a derivative of zero Power Function Rule – reduce the exponent of the variable by one...

1. Find the derivative of the function. y = e−8/x 2. Find the derivative of the...

1. Find the derivative of the function. y = e−8/x 2. Find the derivative of the function. s = t8et 3. Find the derivative of the function. y = ex5 − (ex)5 4. Find the derivative of the function. y = e−5x ln(6x)

solve by separation variable 5, yy'=xe^2+y^2 7, y'=x^2 y/1+x^3 xsiny.y'+cosy

solve by separation variable 5, yy'=xe^2+y^2 7, y'=x^2 y/1+x^3 xsiny.y'+cosy

(a) Find an equation of the plane tangent to the surface xy ln x − y^2...

(a) Find an equation of the plane tangent to the surface xy ln x − y^2 + z^2 + 5 = 0 at the point (1, −3, 2) (b) Find the directional derivative of f(x, y, z) = xy ln x − y^2 + z^2 + 5 at the point (1, −3, 2) in the direction of the vector < 1, 0, −1 >. (Hint: Use the results of partial derivatives from part(a))

For the function f(x, y)=ln(1+xy) a.Find the value of the directional derivative of f at the...

For the function f(x, y)=ln(1+xy) a.Find the value of the directional derivative of f at the point (-1, -2) in the direction <3,4>. b.Find the unit vector that gives the direction of steepest increase of f at the point (2,3).

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of...

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of the vector v→=i→−2j→+2k→

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of...

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of the vector v→=i→−2j→+2k→.