Find an interval of length 0.2 that contains a root of the equation sin(x)= (x)^2 -...

Find the root of the function f(x) = 8 - 4.5 ( x - sin x...

Find the root of the function f(x) = 8 - 4.5 ( x - sin x ) in the interval [2,3]. Exhibit a numerical solution using Bisection method.

1) Find the length of the parametric curve x=2 cos(t) , y=2 sin(t) on the interval...

1) Find the length of the parametric curve x=2 cos(t) , y=2 sin(t) on the interval [0, pi]. 2) A rope lying on the floor is 10 meters long and its mass is 80 kg. How much work is required to raise one end of the rope to a height of 15 meters?

Sketch y = 2 sin(x) + x - 2 (b) This graph intersects the x-axis exactly...

Sketch y = 2 sin(x) + x - 2 (b) This graph intersects the x-axis exactly once. (i) Show that the x-intercept of the graph does not lie in the interval (0, 0.7) (ii) Find the the value of a, 0<a<1 for which the graph will cross the x-axis in the interval (a, a + 0.1) and state this interval (iii) Given x = alpha is the root of the equations 2 Sin(x) + x - 2 = 0, explain...

Show that the equation x+sin(x/3)−8=0 has exactly one real root. Justify your answer.

Show that the equation x+sin(x/3)−8=0 has exactly one real root. Justify your answer.

for a and b use x= Square root x and g(x)=x/2 a)      Find the arc length...

for a and b use x= Square root x and g(x)=x/2 a)      Find the arc length of the curve of f(x) for 0≤x≤4.                   b)      Find the surface area of the solid of revolution revolved about the x-axis of             f(x) for 0≤x≤4.

Determine the length of the graph of the given equation in the indicated interval. a) y=...

Determine the length of the graph of the given equation in the indicated interval. a) y= 4x^(3/2) from the point (0,0) to the point (1,4) b) y^2 = x in the interval(range) [-1,1] c) y= sin(x) in the interval (range) [0,pi] d) y=ln(cos x) between the values x=0 and x= pi/2

Let f(x)=sin(x)+x^3-2. Use the secant method to find a root of f(x) using initial guesses x0=1...

Let f(x)=sin(x)+x^3-2. Use the secant method to find a root of f(x) using initial guesses x0=1 and x1=4. Continue until two consecutive x values agree in the first 2 decimal places.

find the equation of a tangent line to the curve x = ( square root of...

find the equation of a tangent line to the curve x = ( square root of t) / (1+t^2) at t = 4

Consider the function on the interval (0, 2π). f(x) = sin(x)/ 2 + (cos(x))2 (a) Find...

Consider the function on the interval (0, 2π). f(x) = sin(x)/ 2 + (cos(x))2 (a) Find the open intervals on which the function is increasing or decreasing. (Enter your answers using interval notation.) increasing     decreasing     (b) Apply the First Derivative Test to identify the relative extrema. relative maximum     (x, y) =    relative minimum (x, y) =

Consider x^2 +sin(y)=4xy^2 +1 a.)Use Implicit differentiation to find dy/dx b.) find an equation tangent of...

Consider x^2 +sin(y)=4xy^2 +1 a.)Use Implicit differentiation to find dy/dx b.) find an equation tangent of the line to the curve x^2 +sin(y)=4xy^2 +1 at (1,0)