Ms. Taylor has a budget of $1500 to spend on a table and 6 chairs. The total price she spent was $249 under her budget. The table costs 3 times more than a chair. What was the price of the table?

1500 - 249 = $1,251

Let c represent the cost of one chair.

6c + 3c = 1251

c = 1251/9

c = 139

Well, if Ms. Taylor spent $249 under her budget, then she spent a total of $1500 - $249 = $1251 on the table and 6 chairs.

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.

Let's denote the price of a chair as "x."

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.

To find the price of the table, we can start by setting up some equations based on the given information.

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.