1500 - 249 = $1,251
Let c represent the cost of one chair.
6c + 3c = 1251
c = 1251/9
c = 139
Let c represent the cost of one chair.
6c + 3c = 1251
c = 1251/9
c = 139
Let's say the price of a chair is C. That means the price of the table would be 3C, since the table costs 3 times more than a chair.
So the equation we have is:
6C + 3C = $1251
Simplifying that, we get:
9C = $1251
Now, dividing both sides by 9 gives us:
C ≈ $139
So the price of a chair is approximately $139.
And since the table costs 3 times more, the price of the table would be 3 * $139 = $<<3*139=417>>417.
So the price of the table is $417.
Since the table costs 3 times more than a chair, the price of the table would be 3x.
Ms. Taylor has a budget of $1500, and she spent $249 less than her budget. Therefore, the total price she spent can be calculated by subtracting $249 from $1500:
Total price spent = $1500 - $249 = $1251
Ms. Taylor bought 6 chairs, and each chair costs x dollars. So, the total price of the chairs would be 6x.
We can now set up an equation to represent the given information:
Table price + Chair price = Total price spent
3x + 6x = $1251
Combining like terms, we have:
9x = $1251
To find the value of x, we need to divide both sides of the equation by 9:
x = $1251 / 9
Now, we can solve for x:
x ≈ $139
Therefore, the price of a chair is approximately $139.
Since the table costs 3 times more than a chair, the price of the table would be:
3 * $139 = $417
So, the price of the table is $417.
Let's assume the price of one chair is represented by 'x' dollars. According to the question, the table costs 3 times more than a chair. Therefore, the price of the table can be represented as '3*x' dollars.
Ms. Taylor has a budget of $1500, and she spent $249 under her budget. So, the total amount she spent on the table and chairs can be represented as '(3*x + 6*x) - $249' dollars.
Given that the total amount spent is $249 under the budget, we can set up the equation:
(3*x + 6*x) - $249 = $1500
Now, let's solve this equation to find the value of 'x', which represents the price of one chair:
9*x - $249 = $1500
9*x = $1500 + $249
9*x = $1749
x = $1749 / 9
x ≈ $194.33
Therefore, the price of one chair is approximately $194.33.
Since the price of the table is three times that of a chair, we can multiply the price of one chair by 3 to find the price of the table:
Price of the table = 3 * $194.33
Price of the table ≈ $582.99
So, the price of the table is approximately $582.99.