Vladimir builds 3 legged stools and 4 legged tables. Last month he used 72 legs to build 3 more stools than tables. How many stools and how many tables did he build?

Take away the legs of the 3 extra stools, which leaves us with 72-9=63 legs for equal number of stools and tables.

Divide 63 by the total number of legs of one of one set (7 legs for 1 table and 1 stool), we have 63/7=9 sets.
So he made 9 tables and 12 stools.

12stools, 9 tables😆

To find the number of stools and tables that Vladimir built, we can set up a system of equations using the given information.

Let's assume that Vladimir built "S" stools and "T" tables.

According to the question:
1) Vladimir builds 3 legged stools. So, the total number of legs contributed by stools is 3S.
2) Vladimir builds 4 legged tables. So, the total number of legs contributed by tables is 4T.
3) Last month, the total number of legs used to build stools and tables was 72.

From the given information, we can set up the following equations:

Equation 1: 3S + 4T = 72 (since the total number of legs used was 72)
Equation 2: S = T + 3 (since Vladimir built 3 more stools than tables)

To solve this system of equations, we can substitute Equation 2 into Equation 1 and solve for T:

3(T + 3) + 4T = 72
3T + 9 + 4T = 72
7T + 9 = 72
7T = 72 - 9
7T = 63
T = 63 / 7
T = 9

Now, we can substitute the value of T back into Equation 2 to find S:

S = T + 3
S = 9 + 3
S = 12

So, Vladimir built 12 stools and 9 tables.

14 tabls 9 stols

7 and 9

15 tables 4 stools all up

I have no idea!