graph the function over a one-period interval. Graph the basic function with a dotted line, then...

Determine the amplitude, the period and the phase shift of the function 1.  y = 1/3 cos...

Determine the amplitude, the period and the phase shift of the function 1.  y = 1/3 cos ( -3 x ) + 1 2. y =   cos ( - 2 PIE x ) + 2 3. y = ½ sin (2 PIE x + PIE ) 4. y = - ¼ cos (PIE x - 4 ) 5. y = 2 sin (2 PIE x + 1 ) 6. y = ½ sin ( 2 x - PIE/4 )

1) Find the arc length of the graph of the function over the indicated interval. Show...

1) Find the arc length of the graph of the function over the indicated interval. Show your work.   y=ln(cosx)   ;   [ 0 , π/4] 2) Find the surface area generated by revolving the graph about the x - axis over the indicated interval. Show your work.   y=2x   ;   [ 0 , 3 ]

find the amplitude of y= -4 sin (3x + pie). find the period of y= 3csc...

find the amplitude of y= -4 sin (3x + pie). find the period of y= 3csc 2/3 x find the phase shift of the function y= -5 sin (2x - pie/2) find the exact value of the real number y. Use radian measure y= csc^-1 (2). give the degree measure of theta use trig chart. theta = cos ^-1 (square root 2/2) use a calculator to give the value in degrees. sin^-1 (-0.4848) use a calculator to give the real...

Use the following information to graph the function f over the closed interval [-2,5]. I.) The...

Use the following information to graph the function f over the closed interval [-2,5]. I.) The graph of f is made of closed line segments joined end to end. II.) The graph starts at the point (-2,2) III.) On the interval (-2,0) f’(x) = -2; on the interval (0,1) f’(x) = 1; on the interval (1,3) f’(x) = 0; on the interval (3,5) f’(x) = 2

??(??) = −2?os(?) + 2 a. Graph the function over the interval [-2pi, 2pi]. Use values...

??(??) = −2?os(?) + 2 a. Graph the function over the interval [-2pi, 2pi]. Use values of quadrantal angles. Set up the axes with appropriate scales. Be neat please! b. Give the domain and range of the function c. Find the y-intercept of the graph. d. For what numbers x, on the interval [-pi, pi] is the graph of F(x) decreasing? e. What is the absolute maximum value of F(x) over the interval [0, 2pi]? f. Will the absolute maximum...

1. Find the equation of the tangent line to the graph of ?2? − 5??2 +...

1. Find the equation of the tangent line to the graph of ?2? − 5??2 + 6 = 0 at (3,1). 2.. Find the equation of the normal line to the graph of sin(??) = ? at the point (?/2 ,1). 3.. Find the equation of the tangent line to the graph of cos(??) = ? at the point (0.1) Find implicit differentiation of dy/dx a) xy=x+y b) xcosy=y c)x^3 +y^2=0

A, B, and C wanted to compute the area under the curve f(x)=x−2+2x−6x3+cos(x) over the interval...

A, B, and C wanted to compute the area under the curve f(x)=x−2+2x−6x3+cos(x) over the interval [2,10]. To do this, each one used a different anti-derivative. B used the antiderivative F(x)=−1x11+x2−2x3+sin(x). A used the antiderivative F(x)=−x−11+x2−2x3+sin(x)+2020. C used the antiderivative F(x)=−2x−3+x2−2x3+sin(x). Who, if anyone, completed this problem correctly? a) All three are correct b) Only B c) Only A and B d) Only C e) Only A f) None of them.

Find the area under the graph of the function over the interval given. y=x^2-6x+9; [2,4]

Find the area under the graph of the function over the interval given. y=x^2-6x+9; [2,4]

question number 1: Find the point of inflection of the graph of the function. (If an...

question number 1: Find the point of inflection of the graph of the function. (If an answer does not exist, enter DNE.) f(x) = x + 7 cos x, [0, 2π] (x, y) = DNE    (smaller x-value) (x, y) = DNE    (larger x-value) Describe the concavity. (Enter your answers using interval notation. If an answer does not exist, enter DNE.) concave upward     DNE concave downward question number 2: Find the points of inflection of the graph of the...

An approximation to the integral of a function f(x) over an interval [a, b] can be...

An approximation to the integral of a function f(x) over an interval [a, b] can be found by first approximating f(x) by the straight line that goes through the end points (a, f(a)) and (b, f(b)), and then finding the area under the straight line, which is the area of a trapezoid. In python, write a function trapezint(f, a, b) that returns this approximation to the  integral. The argument f is a Python implementation of the mathematical function f(x). Test your...