I need help forming an equation for this word problem..

A long distance phone company charges $0.027 per minute and a $2 monthly fee. Another long distance phone company charges $0.035 per minute with no monthly fee. Find the number of minutes for which the charges for both companies would be the same.
What is the cost?
__
I don't want the answer, I just need help putting the equation together.

Let the the number of minutes.

Let X be the month's charge of Company A
Let Y be the month's charge of Company B

X = 2 + 0.027 t
Y = 0.035 t

Sewt X = Y and solve for t.

2 = 0.008 t
t = 2/0.008 = ___ minutes

250 min

This is for a project for Beginning Algebra at Great Bridge Middle School 8th grade class. Here's the questions:

The number of companies offering cell phone service has grown rapidly in recent years. The plans they offer vary greatly and it can be difficult to select the plan that is the best cost effect. All three phone plans are offer reliable service, equal phone quality, and equivalent extensive network coverage.

Plan One: A $25 per month fee and a charge of $0.32 per minute. Must purchase a $19.99 phone with a contract for 1 year. Free roaming and long distance .
Plan Two: A $30 per month fee plus a charge of 0.30 cent per minute. Must purchase a $70 phone with a $40 rebate and sign a 2 year contract. Unlimited minutes on weekend.
Plan Three: A $28 per month fee plus $30 per minute. Free phone for new customers with unlimited anytime network minutes.

Develop an equation that would represent the total cost of each plan at the beginning of the month.

Develop an equation that would represent the total cost of each plan after the first month.

Find the total cost of each plan if you used 800 day-time minutes.

To find the number of minutes for which the charges for both companies would be the same, let's assume the number of minutes is represented by the variable "m".

For the first long distance phone company, the cost can be calculated by multiplying the cost per minute ($0.027) by the number of minutes, and then adding the monthly fee ($2):
Cost for first company = 0.027m + 2

For the second long distance phone company, since there is no monthly fee, the cost is simply calculated by multiplying the cost per minute ($0.035) by the number of minutes:
Cost for second company = 0.035m

The equation will be formed by equating the costs for both companies, as we want to find the number of minutes where the charges are the same:
0.027m + 2 = 0.035m

Now, you can solve this equation to find the number of minutes for which the charges for both companies would be the same.