Question #d3b12

3 Answers
Dec 9, 2017

Two Numbers: 13 and -5

Explanation:

The pairs of numbers that have a product of -65:
#{-1,65},{1,-65},{-5,13},{-13,5} #

By summing each of these pairs we see that {-5,13} has the product of -65 and sum of 8

Dec 9, 2017

See a solution process below:

Explanation:

First, let's call the two numbers: #n# and #m#

From the first statement in the problem we can write this equation:

#n xx m = -65#

From the second statement in the problem we can write this equation:

#n + m = 8#

Step 1) Solve the second equation for #n#:

#n + m = 8#

#n + m - color(red)(m) = 8 - color(red)(m)#

#n + 0 = 8 - color(red)(m)#

#n = 8 - m#

Step 2) Substitute #(8 - m)# for #n# in the first equation and solve for #m#:

#n xx m = -65# becomes:

#(8 - m) xx m = -65#

#8m - m^2 = -65#

#8m - color(blue)(8m) + color(red)(m^2) - m^2 = color(red)(m^2) - color(blue)(8m) - 65#

#0 + 0 = m^2 - 8m - 65#

#m^2 - 8m - 65 = 0#

#(m - 13)(m + 5) = 0#

Solution 1:

#m - 13 = 0#

#m - 13 + color(red)(13) = 0 + color(red)(13)#

#m - 0 = 13#

#m = 13#

Solution 2:

#m + 5 = 0#

#m + 5 - color(red)(5) = 0 - color(red)(5)#

#m + 0 = -5#

#m = -5#

The two numbers are: #13# and #-5#

#13 + -5 = 8#

#13 xx -5 = -65#

Dec 9, 2017

The two numbers are -5 and 13.

Explanation:

Let the first number be set to #x#.
Let the second number set to #y#.
#xy#=-65
#x+y=8#
#y=8-x#
#xy#
#=x(8-x)#
#8x-x^2=-65#
#x^2-8x-65=0#
#(x-13)(x+5)=0#
#x=13# or #x=-5#
Therefore
#y=-5 if x=13#
Since #x# and #y# are just defined, they are interchangable.
So, the two numbers are 5 and -13.
#Q.E.D.#