If the square of a positive number is added to five times that number, the result is 36. Find the number?

3 Answers
May 1, 2018

4

Explanation:

Rephrase it into math!

If we let #x# equal the number, then,

#x^2+5x=36#
The square is indicated with #^2#. If we add it to five times that number, or #5*x=5x#, then we get #x^2+5x=36#.

This is a quadratic! We subtract 36 from both sides to get #x^2+5x-36=0#.

Solving it, we get #(x-4)(x+9)#.
Remember, though! The number must be positive. #x>0#.

Therefore the only possible answer is #x=4#.

Yay!

May 1, 2018

The number is 4.
#x = 4#

Explanation:

Rewrite the word problem as an equation.

#x^2 + 5x = 36#

This problem is a quadratic, stated as #x^2 + 5x - 36 = 0#

A simple solution is to find two numbers; numbers which when multiplied = -36, and when added = 5.

Our numbers are 9 and -4. So x + 9 and x - 4 are our roots, leaving x as either -9 or 4. Since our question requires a positive answer, the answer must be 4.

Check:

#4^2 + (5 * 4) - 36 = 0#
#16 + 20 - 36 = 0#
#36 - 36 = 0#

May 1, 2018

The number is #4#.

Explanation:

Let #x# represent the positive number.

#x^2="the square of a positive number"#

#5x="five times that number"#

#=36# #"is the result"#

Put it all together and you get:

#x^2+5x=36#

This is a quadratic equation which can be solved for #x# by setting it equal to zero.

#x^2+5x-36=0#

We can factor #x^2+5x-36# by finding two numbers that when added equal #5# and when multiplied equal #-36#. The numbers #-4# and #9# meet the criteria.

#(x-4)(x+9)=0#

Solve each binomial.

#x-4=0#

#x=4#

#x+9=0#

#x=-9#

#x=-9,4#

We need the positive value of #x#, so #x=4#

Check.

#4^2+5*4=36#

#16+20=36#

#36=36#