Maria opens a savings account with $50 and then saves $19 each week. How many weeks will it take for
her account to reach $259? Represent this problem with an equation in the form px + q = r. (1 point)
19x + 50 = 259
To solve this problem, we can use the equation in the form px + q = r.
Let's break down the information given:
Initial amount in the account (q) = $50
Amount saved each week (p) = $19
Target amount needed (r) = $259
We need to find the number of weeks it will take for Maria's account to reach $259. Let's use the variable "x" to represent the number of weeks.
Now, we can set up the equation:
px + q = r
Substituting the given values:
19x + 50 = 259
To solve for x, we need to isolate the x term.
Subtracting 50 from both sides:
19x = 259 - 50
19x = 209
Finally, divide both sides of the equation by 19:
x = 209/19
Using long division, we can calculate the value approximately:
x ≈ 11
Hence, it will take approximately 11 weeks for Maria's account to reach $259.
Let x represent the number of weeks it takes for Maria's account to reach $259.
Given:
Maria opens a savings account with $50.
She saves $19 each week.
Therefore, the total amount in her account after x weeks can be represented as:
px + q = r
where p represents the amount saved each week ($19), q represents the initial amount in the account ($50), and r represents the target amount ($259).
So, the equation can be written as:
19x + 50 = 259