The number of trees in each row is inversely proportional to the number of rows. The number of boys is inversely proportional to the number of girls

The number of trees in each row is inversely proportional to the number of rows. The number of boys is inversely proportional to the number of girls

The number of trees in each row is inversely proportional to the number of rows
The number of boys is inversely proportional to the number of girls (wrong, inversely proportional)
because
Tree per row x rows = total
Number of boys + number of girls = total number

The number of rows of seats in the classroom is m. The number of seats in each row in the classroom is 6 more than the number of rows. How many seats are there in the classroom

The number of seats in each row is a column. It is 6 more than the number of rows. The column is m + 6, and the row is m, so the total number of seats is m (M + 6)

Let the number of rows of seats in the classroom be m, which is expressed by algebraic formula: (1) the number of seats in each row in the classroom is 6 more than the number of rows of seats, and the total number of seats in the teacher is 3
How many seats are there? (2) the number of rows of seats in the classroom is 2 / 3 of the number of seats in each row. How many seats are there in the classroom?

M÷2/3=3/2M
M*3/2M=3/2M²
There are 3 / 2M and 178 seats in the classroom

Suppose the number of rows of seats in the classroom is m, and the number of seats in each row is 6. In algebra, how many seats are there in the classroom
Give the algebraic formula 2x + 3Y a practical meaning and write it out

X is the price of a pencil, y is the price of a book
2X + 3Y represents the total price of two pens and three notebooks