Question

If x⁷ . y⁹ = (x + y)¹⁶ then show that `"dy"/"dx" = "y"/"x"`

Answer 1

Given x⁷.y⁹ =(x+y)¹⁶ 

Taking log on both sides 

Log(x⁷.y⁹) = log(x+y)¹⁶ 

7 log x + 9 log y - 16 log (x+y) 

Differentiating w.r.t.x 

`7. 1/"x" + 9. 1/"y" "dy"/"dx" = 16 . 1/("x + y") (1 + "dy"/"dx")`

`=> 7/"x" + 9/"y" . "dy"/"dx" = 16/("x + y") + 16/("x + y") "dy"/"dx"`

`=> 9/"y" "dy"/"dx" - 16/("x + y") "dy"/"dx" = 16/("x + y") - 7/"x"`

`=>"dy"/"dx" [9/"y" - 16/"x + y"] = (16 "x" - 7 ("x + y"))/("x" ("x + y"))`

`=>"dy"/"dx" [(9"x" + 9"y" - 16"y")/("y"("x" + "y"))] = (16"x" - 7"x" - 7"y")/"x (x + y)"`

`=> "dy"/"dx" [(9"x" - 7"y")/("y" ("x + y"))] = (9"x" - 7"y")/"x (x +y)"`

`=> "dy"/"dx" = (9"x" - 7"y")/("x (x + y)") xx ("y" ("x + y"))/(9"x" - 7"y") = "y"/"x"`

`=> "dy"/"dx" = "y"/"x"`