Advertisements
Advertisements
प्रश्न
Find the differential equation of the following:
y = c(x – c)2
Advertisements
उत्तर
y = c(x – c)2 .......(1)
y = c(x2 – 2cx + c2)
y = cx2 – 2c2x + c3
Differentiating w.r. to x
`("d"y)/("d"x) = "c"[2x] - 2"c"^2(1) + 0`
`("d"y)/("d"x) = 2"c"x - 2"c"^2`
⇒ `("d"y)/("d"x) = 2"c"(x - "c")` .........(2)
From (1) and (2)
`y/((("d"y)/("d"x))) = ("c"(x - "c")^2)/(2"c"(x - "c"))`
`y/((("d"y)/("d"x))) = ((x - "c"))/2`
⇒ `(x - "c") = (2y)/((("d"y)/("d"x)))`
c = `x - [(2y)/((("d"y)/("d"x)))]`
Substituting this value of c and (x – c) in (1), we get
y = `x - [(2y)/((("d"y)/("d"x)))] [(2y)/((("d"y)/("d"x)))]^2`
y = `((x ("d"y)/("d"x) - 2y))/((("d"y)/("d"x))) [(4y^2)/(("d"y)/("d"x))^2]`
y = `((x("d"y)/("d"x)- 2y)(4y^2))/(("d"y)/("d"x))^3`
⇒ `(("d"y)/("d"x))^3 = ((x ("d"y)/("d"x) - 2y)(4y^2))/y`
⇒ `(("d"y)/("d"x))^3 = (x ("d"y)/("d"x) - 2y) (4y^2)`
`(("d"y)/("d"x))^3 = 4xy ("d"y)/("d"x) + 8y^2`
or
`(("d"y)/("d"x))^3 - 4xy ("d"y)/("d"x) + 8y^2` = 0
APPEARS IN
संबंधित प्रश्न
Find the order and degree of the following differential equation:
`("d"^3y)/("d"x^3) = 0`
Find the order and degree of the following differential equation:
(2 – y”)2 = y”2 + 2y’
Find the order and degree of the following differential equation:
`(("d"y)/("d"x))^3 + y = x - ("d"x)/("d"y)`
Find the differential equation of the following:
x2 + y2 = a2
Choose the correct alternative:
The degree of the differential equation `("d"^4y)/("d"x^4) - (("d"^2y)/("d"x^2))^4 + ("d"y)/("d"x) = 3`
Choose the correct alternative:
The order and degree of the differential equation `(("d"^2y)/("d"x^2))^(3/2) - sqrt((("d"y)/("d"x))) - 4 = 0` are respectively
Choose the correct alternative:
Th e differential equation `(("d"x)/("d"y))^3 + 2y^(1/2) = x` is
Choose the correct alternative:
The differential equation formed by eliminating a and b from y = aex + be-x is
Choose the correct alternative:
The differential equation formed by eliminating A and B from y = e-2x (A cos x + B sin x) is
Solve yx2dx + e–x dy = 0
