A line has equation 4x + y + k = 0 and a curve has equation y = kx? + 3

A line has equation 4x + y + k = 0 and a curve has equation y = kx? + 3, where k is a constant. a) Find the two values of k for which the line is a tangent to the curve b) Find the equation of the straight line joining the points on the curve for these two values of k.A line has equation 4x + y + k = 0 and a curve has equation y = kx? + 3, where k is a constant. a) Find the two values of k for which the line is a tangent to the curve b) Find the equation of the straight line joining the points on the curve for these two values of k.

The lines k1, k2 and k3 represent three different equations as shown in thegraph below. The solution of the equations represented by the lines k1 and k3 isx = 3 and y = 0 while the solution of the equations represented by the lines k2and k3 is x = 4 and y = 1.1Which of these is the equation of the line k3?(a) x - y = 3(b) x - y = -3(c) x + y = 3(d) x + y = 1

Let x and y be positive real numbers such that x2 + y2 = 1 and (3x – 4x3)(3y – 4y3) = . Then x + y is , then k is

.Any point on line x = y is of the form:a. (k, -k)b. (0, k)c. (k, 0)d. (k, k)

Given that 3 is the gradient of the line with equation y = 3kx – 11, find the value of k.