Advertisements
Advertisements
Question
If y = 500e7x + 600e-7x, then show that y2 – 49y = 0.
Advertisements
Solution
y = 500e7x + 600e-7x
`y_1 = "dy"/"dx" = 500 "d"/"dx" (e^(7x)) + 600 "d"/"dx" (e^(-7x))`
`= 500 (7e^(7x)) + 600(- 7e^(-7x))`
`y_2 = ("d"^2"y")/"dx"^2 = 500xx7 "d"/"dx" (e^(7x)) + 600(-7) "d"/"dx" (e^(-7x))`
`= 500 xx 7(7e^(7x)) + 600 xx (-7)(-7) e^(-7x)`
`= 500 xx 49e^7x + 600 xx 49e^(-7x)`
`y_2 = 49 [500 r^(7x) + 600e^(-7x)]` = 49y
(or) y2 – 49y = 0
APPEARS IN
RELATED QUESTIONS
Differentiate the following with respect to x.
`(3 + 2x - x^2)/x`
Differentiate the following with respect to x.
`e^x/(1 + e^x)`
Differentiate the following with respect to x.
ex (x + log x)
Differentiate the following with respect to x.
sin(x2)
Find `"dy"/"dx"` for the following function.
x2 – xy + y2 = 1
If 4x + 3y = log(4x – 3y), then find `"dy"/"dx"`
Differentiate the following with respect to x.
(sin x)tan x
Differentiate the following with respect to x.
`sqrt(((x - 1)(x - 2))/((x - 3)(x^2 + x + 1)))`
If y = tan x, then prove that y2 - 2yy1 = 0.
If y = 2 sin x + 3 cos x, then show that y2 + y = 0.
