Question
How would you solve the following equation?
15 = y – 3
1.) Subtract 3 from both sides
2.) Subtract 15 on both sides
3.) Add 15 on both sides
4.) Add 3 on both sides
15 = y – 3
1.) Subtract 3 from both sides
2.) Subtract 15 on both sides
3.) Add 15 on both sides
4.) Add 3 on both sides
Answers
Answer
Solve for x.
x/5 − 3 = −6
x/5 − 3 = −6
Answer
Select the like terms.
−6a + 7 − 3b + 2a + ab
1.) -3b
2.) +ab
3.) -6a
4.) +2a
5.) +7
−6a + 7 − 3b + 2a + ab
1.) -3b
2.) +ab
3.) -6a
4.) +2a
5.) +7
Answer
only choose one response
Answer
Printer A prints business cards for $.10 each plus a setup charge of $15.
Printer B offers business cards for $0.15 each with a set up charge of $10.
What number of cards would make the cost the same at either printer?
Printer B offers business cards for $0.15 each with a set up charge of $10.
What number of cards would make the cost the same at either printer?
Answered by
GPT 3.5
1.) Subtract 3 from both sides
15 - 3 = y - 3 - 3
12 = y
Therefore, y = 12
15 - 3 = y - 3 - 3
12 = y
Therefore, y = 12
Answered by
GPT 3.5
To solve for x in the equation x/5 - 3 = -6, we can follow these steps:
1.) Add 3 to both sides:
x/5 - 3 + 3 = -6 + 3
x/5 = -3
2.) Multiply both sides by 5 to get rid of the fraction:
5*(x/5) = -3*5
x = -15
Therefore, x = -15.
1.) Add 3 to both sides:
x/5 - 3 + 3 = -6 + 3
x/5 = -3
2.) Multiply both sides by 5 to get rid of the fraction:
5*(x/5) = -3*5
x = -15
Therefore, x = -15.
Answered by
GPT 3.5
The like terms in the expression are terms that contain the same variables raised to the same powers. In this case, the like terms are:
-6a and 2a (both have the variable a)
-3b and ab (both have the variable b)
Therefore, the like terms are:
1.) -3b
2.) +ab
3.) -6a
4.) +2a
-6a and 2a (both have the variable a)
-3b and ab (both have the variable b)
Therefore, the like terms are:
1.) -3b
2.) +ab
3.) -6a
4.) +2a
Answered by
GPT 3.5
3.) -6a
Answered by
GPT 3.5
Let's denote the number of cards as x.
For Printer A:
Cost = 0.10x + 15
For Printer B:
Cost = 0.15x + 10
To find the number of cards that make the cost the same at either printer, we need to set the two costs equal to each other and solve for x:
0.10x + 15 = 0.15x + 10
0.10x - 0.15x = 10 - 15
-0.05x = -5
x = -5 / -0.05
x = 100
Therefore, 100 cards would make the cost the same at either printer.
For Printer A:
Cost = 0.10x + 15
For Printer B:
Cost = 0.15x + 10
To find the number of cards that make the cost the same at either printer, we need to set the two costs equal to each other and solve for x:
0.10x + 15 = 0.15x + 10
0.10x - 0.15x = 10 - 15
-0.05x = -5
x = -5 / -0.05
x = 100
Therefore, 100 cards would make the cost the same at either printer.