What are the coordinates of the points of intersection for these set of curves: #y=x(2x+5) and y= x(1+x)^2#?

3 Answers
Dec 7, 2016

#(-2, -2); (2, 18); (0,0)#

Explanation:

Substitute the first equation into the second.

#x(2x + 5) = x(1 + x)^2#

#2x^2 + 5x = x(1 + 2x + x^2)#

#2x^2 + 5x = x + 2x^2 + x^3#

#0 = x^3 + 2x^2 - 2x^2 + x - 5x#

#0 = x^3 - 4x#

#0 = x(x^2 - 4)#

#x = 0 and +- 2#

#:.y = 0(1 + 0)^2# and #y = 2(1 + 2)^2# and #y = -2(1 - 2)^2#

#y = 0 and 18 and -2#

Hence, the solution set is #(-2, -2), (2, 18), (0, 0)#.

Hopefully this helps!

Dec 7, 2016

The points of intersection are: #(-2,-2), (0, 0), and (2,18)#

Explanation:

Because the y coordinate of one function must equal the y coordinate of the other function (at the point of intersection), we can set the right sides of the two equations equal:

#x(2x + 5) = x(x + 1)^2#

Before we divide both sides by x, please observe that this common factor makes #x = 0# the x coordinate of one of the points of intersection: #(0, 0)#

Divide both sides by x:

#2x + 5 = (x + 1)^2#

Expand the square:

#2x + 5 = x^2 + 2x + 1#

add -2x - 1 to both sides:

#4 = x^2#

Perform the square root operation on both sides:

#x = -2 and x = 2#

check x = -2:

#y = (-2)(2(-2) + 5) = -2(1) = -2#
#y = (-2)(-2 + 1)^2 = -2(-1)^2 = -2#

The point #(-2, -2)# checks

check x = 2:

#y = 2(2(2) + 5) = 2(9) = 18#
#y = (2)(2 + 1)^2 = 2(3)^2 = 18#

The point #(2, 18)# checks.

Dec 7, 2016

(-2, -2), (0,0) and (2,18)

Explanation:

The two curves will intersect at points, obtained by solving the equation #x(2x+5)=x(1+x)^2#

#2x^2 +5x= x(1+2x+x^2)#

#2x^2 +5x = x +2x^2 +x^3#

#x^3 -4x=0#

#x(x^2-4)=0#

x(x-2)(x+2)=0#-># x= -2, 0 and 2

The corresponding y values would be -2,0 and 18

The points for intersection would thus be (-2, -2), (0,0) and (2,18)