At what point does the normal to y= (-1)+(4x^2) at (1,3) intersect the parabola a SECOND...

What is the distance between the point (1, 2) and the parabola y = x^2.

What is the distance between the point (1, 2) and the parabola y = x^2.

1. (a) If a chord of the parabola y 2 = 4ax is a normal at...

1. (a) If a chord of the parabola y 2 = 4ax is a normal at one of its ends, show that its mid-point lies on the curve 2(xx 2a) = y 2 a + 8a 3 y 2 . Prove that the shortest length of such a chord is 6a√3 (b) Find the asymptotes of the hyperbola x 2 2y 2 + 2x + y + 9 = 0.

. Find the second degree equation if the vertex of the parabola is (4, -2) and...

. Find the second degree equation if the vertex of the parabola is (4, -2) and one point on the parabola is (1, 5). Sketch y = ?−4 /(?+1)(?−2) Tell me ALL your considerations! If there is a horizontal asymptote, does your graph cross it? Where? Show me your work to justify your answer.

consider the region r bounded by the parabola y=4x^2 and the lines x=0 and y=16 find...

consider the region r bounded by the parabola y=4x^2 and the lines x=0 and y=16 find the volume of the solid obtained by revolving R about the line x=1

Find the point with x ≥ 0 on the parabola y = (1/8)x^2 − 5 that...

Find the point with x ≥ 0 on the parabola y = (1/8)x^2 − 5 that is closest to the point ( 0 , 1 ).

Determine whether the lines L1:→r(t)=〈−2,−1,3〉t+〈−5,−3,−1〉 and L2:→p(s)=〈4,2,−6〉s+〈4,−1,0〉 intersect. If they do, find the point of intersection.

Determine whether the lines L1:→r(t)=〈−2,−1,3〉t+〈−5,−3,−1〉 and L2:→p(s)=〈4,2,−6〉s+〈4,−1,0〉 intersect. If they do, find the point of intersection.

Consider plane P: 4x -y + 2z = 8, line: <x, y, z> = <1+t, -1+2t,...

Consider plane P: 4x -y + 2z = 8, line: <x, y, z> = <1+t, -1+2t, 3t>, and point Q(2,-1,3) b) Find the perpendicular distance between point Q and plane P

a. Draw the parabola y=x^2 and the point (0,3) in the square window -2 < x...

a. Draw the parabola y=x^2 and the point (0,3) in the square window -2 < x < 2 and 0 < y <4. b.    Fill in the four blanks to complete the formula giving the distance D from the point (0,3) to a general point (x,y) in the plane. D = Sqrt[( - )^2 + ( - )^2]   c. Find the points on the parabola y=x^2 which are closest to the point (0,3). You must have both appropriate calculations...

At what point in the first quadrant does the line with equation y = x 2+...

At what point in the first quadrant does the line with equation y = x 2+ intersect the circle with radius 6 and center (-1,0)?

Find the point on the curve y=4x+2 closest to the point (0,4). (x,y)= (_____,_____)

Find the point on the curve y=4x+2 closest to the point (0,4). (x,y)= (_____,_____)