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Question
For the following equations, determine its order, degree (if exists)
`x^2 ("d"^2y)/("d"x^2) + [1 + (("d"y)/("d"x))^2]^(1/2)` = 0
Sum
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Solution
`x^2 ("d"^2y)/("d"x^2) - [1 + (("d"y)/("d"x))^2]^(1/2)`
On squaring both sides, we get
`x^4(("d"^2y)/("d"x^2))^2 = [1 + (("d"y)/("d"x))^2]`
`x^4(("d"^2y)/("d"x^2))^2 = 1 + (("d"y)/("d"x))^2`
In this equation
The highest order derivative is `("d"^2y)/("d"x^2)` and its power is 2.
∴ Its order = 2 and degree = 2
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Chapter 10: Ordinary Differential Equations - Exercise 10.1 [Page 148]
