" b) "x^(3)y,x^(2)y^(2)" and "xy^(3)" are continued proportional."(quad )

x^(3)y, x^(2)y^(2) " and " xy^(3) are in continued proportional.

x^3y, x^2y^2 and xy^3 are in continued proportion or not.

Write True or False x^3y,x^2y^2 and xy^3 are in continued proportion.

x^(3) + x^(2)y+ xy^(2) + y^(3) = 81

x^(3)+x^(2)y+xy^(2)+y^(3)

[" 2.If two positive integers "a" and "b" are written as "a=x^(3)y^(2)" and "b=xy^(3);x,y" are prime "],[[" numbers,then "HCF(a,b)" is "," (c) "x^(3)y^(3)],[" (a) "xy," (b) "xy^(2)," (d) "x^(2)y^(2)]]

Find the : (i) fourth proportional to 2xy , x^(2) and y^(2) . (ii) third proportional to a^(2) - b^(2) and a + b . (iii) mean proportion to (x - y) and (x^(3) - x^(2)y)

If two positive integers a and b are written as a=x^(3)y^(2) and b=xy^(3);x,y are prime numbers then HCF(a,b) is (a) xy (b) xy^(2) (c) x^(3)y^(3) (d) x^(2)y^(2)

x^(3) + xy^(2) - x^(2) y - y^(3) = "_______"

x^(3)-3xy^(2)=183x^(2)y-y^(3)=26 If x,y in N