A software company sells an education version (e) and a commercial version (c) of its popular image editing software. During the month of January 500 copies of the software are sold with sales totaling $180,000. If the price of the education version is $150 and the price of the commercial version is $600 how many of each version were sold?

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Aliwohaish12 Aliwohaish12 · Answer 1 · 2017-04-30T23:59:08+02:00

150x+600 (500-x)=180000
Solve for x
X=266.66670 education version

500-266.6667=233.3333commercial version

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chisnau chisnau · Answer 2 · 2019-09-18T07:04:02+02:00

Answer:

The company sold nearly 267 educational version copies and nearly 233 commercial version copies.

Step-by-step explanation:

Let the education version software be = e

Let the commercial version software be = c

Equations forms:

[tex]e+c=500[/tex] .......(1)

[tex]150e+600c=180000[/tex] ...... (2)

Multiplying (1) by 150 and subtracting from (2)

[tex]150e+150c=75000[/tex] subtracting this from (2)

450c=105000

c = 233.33 rounding to 233

Then [tex]e=500-233=267[/tex]

e = 267

Hence, the company sold nearly 267 educational version copies and nearly 233 commercial version copies.