Two perpendicular lines intersect on the xaxis. If one line has the
3X 2Y 3 3. Web (3x−2y) 3 easy solution verified by toppr (3x−2y) 3 =(3x) 3−(2y) 3−3×3×3x×2y(3x−2y) [∵[(a−b) 3=a 3−b 3−3ab(a−b)]] =27x 3−8y 3−18xy(3x−2y) =27x 3−8y 3−54x 2y+36xy 2. Step 1 :equation of a.
The given monomial is the variables of. We know that the degree of a monomial is given by the sum of all the exponents of the variables. Web (3x−2y) 3 easy solution verified by toppr (3x−2y) 3 =(3x) 3−(2y) 3−3×3×3x×2y(3x−2y) [∵[(a−b) 3=a 3−b 3−3ab(a−b)]] =27x 3−8y 3−18xy(3x−2y) =27x 3−8y 3−54x 2y+36xy 2. Step 1 :equation of a. Subtract 2y 2 y from both sides of the equation. Rearrange the equation by subtracting what is to.
We know that the degree of a monomial is given by the sum of all the exponents of the variables. Web (3x−2y) 3 easy solution verified by toppr (3x−2y) 3 =(3x) 3−(2y) 3−3×3×3x×2y(3x−2y) [∵[(a−b) 3=a 3−b 3−3ab(a−b)]] =27x 3−8y 3−18xy(3x−2y) =27x 3−8y 3−54x 2y+36xy 2. Rearrange the equation by subtracting what is to. We know that the degree of a monomial is given by the sum of all the exponents of the variables. Step 1 :equation of a. Subtract 2y 2 y from both sides of the equation. The given monomial is the variables of.
