What kind of conic has a set of all points, P, that is 3 times further...
What kind of conic has a set of all points, P, that is 3 times further in distance from (2,0) than its origin? What is the equation for this conic? Thanks in advance
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What kind of conic has a set of all points, P, that is 3 times
further...
3) Consider the equation of the conic below. (4 pts) a. Determine which conic This equation...
3) Consider the equation of the conic below. (4 pts) a. Determine which conic This equation represents. State the conic and explain your decision 3x² + 2y? - 15x + 20y - 4 = 0 Rewrite this equation with a minor change so that the equation now represents the following conic b. circle c. hyperbola d. parabola 1) Use the animation mentioned earlier on page 910 to create two graphs of two ellipses using the instructions below. (3 pts each)....
60 is 3 times as much as 20. What kind of comparison is this? Select one: a. simple ratio, smaller as base b. times diff...
60 is 3 times as much as 20. What kind of comparison is this? Select one: a. simple ratio, smaller as base b. times difference, smaller as base c. simple ratio, larger as base d. times difference, larger as base e. None of these 60 is 200% more than 20. What kind of comparison is this? Select one: a. simple difference, smaller as base b. percent difference, smaller as base c. simple difference, larger as base d. percent difference, larger...
//NOTE: This question has a graph included with points at (-2,0) (1,0) (2,0). all the zeros....
//NOTE: This question has a graph included with points at (-2,0) (1,0) (2,0). all the zeros. The polynomial P(x) polotted below is a cubic. From the polt below, it is easy to determine the three factors of P(x). With a little more work, you can also determine the leading coefficient of P(x). (a) Find a factorization of P(x) which includes the unkown leading coefficient a and the three factors you can read from the plot, like P(x) =a(factor 1)(factor 2)(factor...
equation for the surface consisting of all points P
Find an equation for the surface consisting of all points P forwhich the distance from P to the x-axis is twice the distance from P to theyz-plane. Identify the surface.
The p-Center Problem. Given a set of n points and the distance dij between any two...
The p-Center Problem. Given a set of n points and the distance dij between any two points i and j, find a set of p centers such that the maximum distance from any non-center to its nearest center is minimized. Formulate this problem as an integer program.
Show that the radius of curvature x^(2/3) + y^(2/3) = a^(2/3) at P(x, y) is three times the distance from the origin to the tangent line T.
Show that the radius of curvature x^(2/3) + y^(2/3) = a^(2/3) at P(x, y) is three times the distance from the origin to the tangent line T.
3. An indifference curve is a. the set of all points of consumer equilibrium as the...
3. An indifference curve is a. the set of all points of consumer equilibrium as the consumer's income changes. b. all combinations of goods X and Y that yield the same total utility. c. all combinations of goods X and Y that yield the same marginal utility. d. the set of all goods that the consumer can afford given her income and the prices of the goods. 4. Which of the following is NOT a property of an indifference curve?...
__8. The set of all critical points of the autonomous equation p' = p2-2p + 1...
__8. The set of all critical points of the autonomous equation p' = p2-2p + 1 are A. {0,-, 1} B. {1} C. {-1,1} D.{-1}
Problem 1. (33 Points) (a) Consider the following: Are these two planes parallel? If not, find...
Problem 1. (33 Points) (a) Consider the following: Are these two planes parallel? If not, find the parametric equation of their line of intersection (b) Describe the set of all points P = (x, y, z) such that the distance from P to the y-axis is twice the distance from P to the zz-plane. (c) Describe the set of all points P (r, y, 2) such that the distance from P to the plane x + 5y-4z = 1 equals...
show all working (1 point) Determine whether the three points P= (4, -3, -5), Q= (7,3,4),...
show all working
(1 point) Determine whether the three points P= (4, -3, -5), Q= (7,3,4), R= (10,9,13) are collinear by computing the distances between pairs of points. Distance from P to Q: Distance from Q to R: Distance from P to R: Are the three points collinear (y/n)?
3) Consider the equation of the conic below. (4 pts) a. Determine which conic This equation represents. State the conic and explain your decision 3x² + 2y? - 15x + 20y - 4 = 0 Rewrite this equation with a minor change so that the equation now represents the following conic b. circle c. hyperbola d. parabola 1) Use the animation mentioned earlier on page 910 to create two graphs of two ellipses using the instructions below. (3 pts each)....
The p-Center Problem. Given a set of n points and the distance dij between any two points i and j, find a set of p centers such that the maximum distance from any non-center to its nearest center is minimized. Formulate this problem as an integer program.
3. An indifference curve is a. the set of all points of consumer equilibrium as the consumer's income changes. b. all combinations of goods X and Y that yield the same total utility. c. all combinations of goods X and Y that yield the same marginal utility. d. the set of all goods that the consumer can afford given her income and the prices of the goods. 4. Which of the following is NOT a property of an indifference curve?...
__8. The set of all critical points of the autonomous equation p' = p2-2p + 1 are A. {0,-, 1} B. {1} C. {-1,1} D.{-1}
Problem 1. (33 Points) (a) Consider the following: Are these two planes parallel? If not, find the parametric equation of their line of intersection (b) Describe the set of all points P = (x, y, z) such that the distance from P to the y-axis is twice the distance from P to the zz-plane. (c) Describe the set of all points P (r, y, 2) such that the distance from P to the plane x + 5y-4z = 1 equals...
show all working
(1 point) Determine whether the three points P= (4, -3, -5), Q= (7,3,4), R= (10,9,13) are collinear by computing the distances between pairs of points. Distance from P to Q: Distance from Q to R: Distance from P to R: Are the three points collinear (y/n)?
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