Find the center (h,k) and the radius r of the circle 4 x^2 + 7 x...

Recall the equation for a circle with center (h,k)(h,k) and radius rr. At what point in...

Recall the equation for a circle with center (h,k)(h,k) and radius rr. At what point in the first quadrant does the line with equation y=2x+1y=2x+1 intersect the circle with radius 3 and center (0, 1)? x=? y=?

1) Show that the formulas below represent the equation of a circle. x = h +...

1) Show that the formulas below represent the equation of a circle. x = h + r cos θ y = k + r sin θ 2) Use the equations in the preceding problem to find a set of parametric equations for a circle whose radius is r = 4 and whose center is (-1,-2). 3)  Plot each of the following points on the polar plane. A(2, π/4), B(1, 3π/2), C(4, π)

The curve C1 is the circle in R 2 of radius 2 centered at the origin,...

The curve C1 is the circle in R 2 of radius 2 centered at the origin, directed counterclockwise; the curve C2 is the hexagon in R 2 with vertices (4, −4), (4, 4), (0, 6), (−4, 4), (−4, −4), (0, −6), directed counterclockwise; and F(x, y) = (y/(x^2 + y^2))i − (x/(x^2+y^2))j. (a) Evaluate R C1 F · dr. (b) Evaluate R C2 F · dr.

Determine the center and radius of the following circle equation: x^2 + y^2 - 12x +...

Determine the center and radius of the following circle equation: x^2 + y^2 - 12x + 16y + 75 = 0

Find a path that traces the circle in the plane y=5 with radius r=5 and center...

Find a path that traces the circle in the plane y=5 with radius r=5 and center (2,5,0) with constant speed 25. r1(s)

A particle in R^2 travels along a circle centered at (x, y) with radius r >...

A particle in R^2 travels along a circle centered at (x, y) with radius r > 0. Parametrize this circular path r(t) as a function of the parameter variable t. Please prove that at all t values, the tangent vector r'(t) is orthogonal to the vector r(t) - vector(x, y)

1.Let y=6x^2. Find a parametrization of the osculating circle at the point x=4. 2. Find the...

1.Let y=6x^2. Find a parametrization of the osculating circle at the point x=4. 2. Find the vector OQ−→− to the center of the osculating circle, and its radius R at the point indicated. r⃗ (t)=<2t−sin(t), 1−cos(t)>,t=π 3. Find the unit normal vector N⃗ (t) of r⃗ (t)=<10t^2, 2t^3> at t=1. 4. Find the normal vector to r⃗ (t)=<3⋅t,3⋅cos(t)> at t=π4. 5. Evaluate the curvature of r⃗ (t)=<3−12t, e^(2t−24), 24t−t2> at the point t=12. 6. Calculate the curvature function for r⃗...

particle in R2 travels along a circle centered at (h,k) with radius a > 0. Parametrize...

particle in R2 travels along a circle centered at (h,k) with radius a > 0. Parametrize this circular path r(t) as a function of the parameter variable t. Please prove that at all t values, the tangent vector r0(t) is orthogonal to the vector r(t)−<h,k>

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.

1020) y=8/sqrt(4x^7)=Ax^B + C. y'=Kx^F + G. y'(9)=H. Find A,B,C,K,F,G,H. ans:7 1026) Find the derivative of...

1020) y=8/sqrt(4x^7)=Ax^B + C. y'=Kx^F + G. y'(9)=H. Find A,B,C,K,F,G,H. ans:7 1026) Find the derivative of y=(5x^(1/4) - 8x^(1/7))^3, when x=2. ans:1 1010) y=3x^2 + 2x + 5 and y'=Ax^2 + Bx + C. Find A,B,C. Next Question: y=(x^2)/7 + x/4 + 2 and y'=Hx^2 + Fx + G. Find H,F,G. ans:6