Question

Q1) (a) What is the distance of a point (x,y) to the line −2x+4y=−16? The solution...

Q1)

(a) What is the distance of a point (x,y) to the line −2x+4y=−16? The solution should be a function of x and y.

(b) The set of points equidistant from the lines −2x+4y=−16 and 5x−4y=28 forms two lines. Give implicit equations for these two lines.

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
Q1) (a) What is the distance of a point (x,y) to the line −2x+4y=−16? The solution...
Q1) (a) What is the distance of a point (x,y) to the line −2x+4y=−16? The solution should be a function of x and y. (b) The set of points equidistant from the lines −2x+4y=−16 and 5x−4y=28 forms two lines. Give implicit equations for these two lines. Please show clear working
Solve the system of linear equations: x-2y+3z=4 2x+y-4z=3 -3x+4y-z=-2 2. Determine whether the lines  x+y=1 and 5x+y=3...
Solve the system of linear equations: x-2y+3z=4 2x+y-4z=3 -3x+4y-z=-2 2. Determine whether the lines  x+y=1 and 5x+y=3 intersect. If they do, find points of intersection.
Find the solution to the linear system of differential equations {x′ = 6x + 4y {y′=−2x...
Find the solution to the linear system of differential equations {x′ = 6x + 4y {y′=−2x satisfying the initial conditions x(0)=−5 and y(0)=−4. x(t) = _____ y(t) = _____
NO SOLUTION IS NEEDED. Please just give the answer. thanks! The distance from the point (3,...
NO SOLUTION IS NEEDED. Please just give the answer. thanks! The distance from the point (3, 2) to the line 3x 4y + 2 = 0 is: (a) 19/25 (b) 3/5 (c) 3/25 (d) 19/5 (xii) The lines 2x 3y + 7 = 0 and 3x + 7y 2 = 0 meet at point (a) ( 43/23, 25/23) (b) ( 43/5, 139/35) (c) ( 1/11, 25/77) (d) (47/17, 107/119) The derivative with respect to x of the function x2ex is...
Without actually solving the differential equation (x^3 - 2x^2 + 5x)y’’ + 4xy’ + 4y =...
Without actually solving the differential equation (x^3 - 2x^2 + 5x)y’’ + 4xy’ + 4y = 0, find a lower bound for the radius of convergence of the power series solutions about the ordinary point x = 3
1) Solve the system by substitution. {7x−7y=−42 {y=2x+7 a) One solution: b) No solution c) Infinite...
1) Solve the system by substitution. {7x−7y=−42 {y=2x+7 a) One solution: b) No solution c) Infinite number of solutions 2) Solve the system by substitution. {5x+4y=27 {y=2x-16 a) One solution: b) No solution c) Infinite number of solutions
find dy/dx a. (x+y)^4 =4y-9x b. y= (x +6)^2x c. y= cos^-1 (3x^2 -5x +1 )
find dy/dx a. (x+y)^4 =4y-9x b. y= (x +6)^2x c. y= cos^-1 (3x^2 -5x +1 )
The paraboloid z = 3x2 + 2y2 + 1 and the plane 2x – y +...
The paraboloid z = 3x2 + 2y2 + 1 and the plane 2x – y + z = 4 intersect in a curve C. Find the points on C that have a maximum and minimum distance from the origin. The point on C is the maximum distance from the origin is (___ , ____ , ____).    The point on C is the minimum distance from the origin is (____ , ____ , ____). So for this question I get...
(An Unbounded Feasible Region). Consider the problem: Maximize: 3x + 4y 2x+y ≥ 10 x+2y ≥...
(An Unbounded Feasible Region). Consider the problem: Maximize: 3x + 4y 2x+y ≥ 10 x+2y ≥ 14 x,y ≥ 0 a) Draw the feasible set for this linear programming problem. Identify the extreme points and infinite rays. b) Express the points (3,7) and (10,10) in terms of the extreme points and infinite rays of the feasible set.
1. Find the distance between the line y=-2x+1 and the point (1, 4). Sketch the line,...
1. Find the distance between the line y=-2x+1 and the point (1, 4). Sketch the line, point, and distance on a graph. 2.If the discriminant is negative what type of solutions would you have?