The circumference of a unit circle is 2π. The absolute value of -3π/2 is: ? of...

a. r=3 - 3cos(Θ), enter value for r on a table when; Θ=0, (π/3),(π/2),(2π/3),π,(4π/3),(3π/2),(5π/3) & 2π...

a. r=3 - 3cos(Θ), enter value for r on a table when; Θ=0, (π/3),(π/2),(2π/3),π,(4π/3),(3π/2),(5π/3) & 2π b. plot points from a, sketch graph c. use calculus to find slope at (π/2),(2π/3),(5π/3) & 2π d. find EXACT area inside the curve in 1st quadrant

1.Given cos(x) = 1/6 with 3π/2 < x < 2π. Find the value of cos(2x). 2....

1.Given cos(x) = 1/6 with 3π/2 < x < 2π. Find the value of cos(2x). 2. which of the following is equivalent to: (8sin(x) + 8 cos(x))^2? 3. which of the following is equivalent to: 12cos(-x)sin(-x)/tan(-x)cot(x+9π)

The center of a circle of radius sqrt(2) lies on the circumference of a circle of...

The center of a circle of radius sqrt(2) lies on the circumference of a circle of radius 1. Find the area of the smaller lune formed by the two circles.

In Euclidean (flat) space, a circle’s circumference C is related to its radius r by C...

In Euclidean (flat) space, a circle’s circumference C is related to its radius r by C = 2πr. Formally, this can be shown by integrating the infinitesimal distance element ds around the circumference: C = ! ds = ! 2π 0 rdθ = 2πr , (1) where the second equality holds because the 2-D Euclidean metric is ds2 = dr2 + r2dθ2, and dr = 0 for a circle of constant radius r. (a) In a 2-D space of positive...

the value of 2/pi times the integral of 1+x over the unit circle is

the value of 2/pi times the integral of 1+x over the unit circle is

Consider the unit circe C (the circle with center the origin in the plane and radius...

Consider the unit circe C (the circle with center the origin in the plane and radius 1). Let S = {α : 2α < (the circumference of C)} . Show that S is bounded above. Let p be the least upper bound of S. Say explicitly what the number p is. This exercise works in the real number system, but not in the rational number system. Why?

Suppose an ant is sitting on the perimeter of the unit circle at the point (1,0)....

Suppose an ant is sitting on the perimeter of the unit circle at the point (1,0). If the ant travels a distance of  2π/3  in the counter-clockwise direction, find the coordinates of the point where the ant stops. (−3‾√2,12) b) (12,3‾√2) c) (−12,3‾√2) d) (−12,−3‾√2) e) (−3‾√2,−12) Which of the following expressions is equal to: 4(sin(x)+cos(x))^2−4 ? a) 1 b) 0 c) 4sin(2x) d) 4cos(2x) e) −4sin(x) f) None of the above

Find the maximum value of f(x,y)=(x^2)(y^7) for x,y≥0on the unit circle. f(max)=?

Find the maximum value of f(x,y)=(x^2)(y^7) for x,y≥0on the unit circle. f(max)=?

If the circumference of my circle is 200,000 feet and I add 10 feet to it,...

If the circumference of my circle is 200,000 feet and I add 10 feet to it, how much bigger is the new radius? (10 pts) If I have 400 ft. of fencing and I make a square enclosure using all the fencing, what is the length of the diagonal of the square. Prove your answer. (8 pts) (A^2 + B^2 = C^2   ….Where A and B are sides of a right triangle and C is the hypothenuse) Jill is twice...

Listing 1 shows ABCD.cpp program to compute diameter, circumference and area for a circle with r,...

Listing 1 shows ABCD.cpp program to compute diameter, circumference and area for a circle with r, radius without user-defined function. Listing 2 shows the expected output of ABCD.cpp on the screen after creating user-defined functions for 3 circles of radius. Write a complete code to compute an output of 3 circles with r, radius as shown in Listing 2. Your answer should have four (4) functions as stated below as function declaration. double displayRadius(double); double displayDiameter(double); double displayCircumference(double); double displayArea(double);