If Jaylan takes the number of stamps he has and multiplies it by 5 and then subtracts 10, he gets 275. How many stamps does he have?(1 point)
Responses
57
57
53
53
2/3
1/3
Let x be the number of stamps Jaylan has. The equation can be written as 5x - 10 = 275. Adding 10 to both sides, we get 5x = 285. Dividing both sides by 5, we find that x = 57. Therefore, Jaylan has 57 stamps.
To find the number of stamps Jaylan has, we need to use the given information that when he multiplies the number of stamps by 5 and then subtracts 10, he gets 275.
Let's set up an equation to represent this situation:
5x - 10 = 275
Where x represents the number of stamps Jaylan has.
To solve the equation, we will isolate x by performing inverse operations. First, we will add 10 to both sides of the equation:
5x = 285
Next, we will divide both sides of the equation by 5:
x = 285/5
Simplifying the right side of the equation, we have:
x = 57
Therefore, Jaylan has 57 stamps.
To find the number of stamps Jaylan has, we can use the given equation where he multiplies the number of stamps by 5 and then subtracts 10 to get 275.
Let's use algebra to solve it step-by-step:
Let the number of stamps Jaylan has be represented by "x".
According to the given equation:
5x - 10 = 275
Now, let's solve for "x":
Adding 10 to both sides of the equation:
5x - 10 + 10 = 275 + 10
5x = 285
Dividing both sides of the equation by 5 to isolate "x":
5x/5 = 285/5
x = 57
Therefore, Jaylan has 57 stamps.