Advertisements
Advertisements
प्रश्न
Find the particular solution of the differential equation `dy/dx + 2y tan x = sin x` given that y = 0 when x = `pi/3`
Advertisements
उत्तर
The given differential equation is,
`dy/dx + 2y tanx = sinx` .....(1)
The above is a linear differential equation of the form of `dy/dx + Py = Q`
where P = 2 tan x; Q = sin x
Now, `If = e^(intPdx) = e^(int2tanxdx) = e^(2log sec x) = sec^2 x`
Now, the solution of (1) is given by
`y xx IF = int [Q xx IF]dx + C`
`=> ysec^2 x = int[sin x xx sec^2x] dx + C`
`=> y sec^2 x = intsecx.tan x dx + C`
when `x = pi/3 , y = 3`
0 = 2 + C
C = -2
Particular solution
`ysec^2x = sec x - 2`
APPEARS IN
संबंधित प्रश्न
For the differential equation, find the general solution:
`dy/dx = (1 - cos x)/(1+cos x)`
For the differential equation, find the general solution:
`dy/dx = sqrt(4-y^2) (-2 < y < 2)`
For the differential equation, find the general solution:
`dy/dx + y = 1(y != 1)`
For the differential equation, find the general solution:
(ex + e–x) dy – (ex – e–x) dx = 0
For the differential equation, find the general solution:
y log y dx - x dy = 0
For the differential equation find a particular solution satisfying the given condition:
`dy/dx` = y tan x; y = 1 when x = 0
At any point (x, y) of a curve, the slope of the tangent is twice the slope of the line segment joining the point of contact to the point (- 4, -3). Find the equation of the curve given that it passes through (-2, 1).
The volume of spherical balloon being inflated changes at a constant rate. If initially its radius is 3 units and after 3 seconds it is 6 units. Find the radius of balloon after t seconds.
In a culture, the bacteria count is 1,00,000. The number is increased by 10% in 2 hours. In how many hours will the count reach 2,00,000, if the rate of growth of bacteria is proportional to the number present?
The general solution of the differential equation `dy/dx = e^(x+y)` is ______.
Find the particular solution of the differential equation:
`y(1+logx) dx/dy - xlogx = 0`
when y = e2 and x = e
Find the particular solution of the differential equation ex tan y dx + (2 – ex) sec2 y dy = 0, give that `y = pi/4` when x = 0
Solve `dy/dx = (x+y+1)/(x+y-1) when x = 2/3 and y = 1/3`
Solve
y dx – x dy = −log x dx
Find the solution of `"dy"/"dx"` = 2y–x.
Solve the differential equation `(x^2 - 1) "dy"/"dx" + 2xy = 1/(x^2 - 1)`.
Solve the differential equation `"dy"/"dx" + 1` = ex + y.
Solve: (x + y)(dx – dy) = dx + dy. [Hint: Substitute x + y = z after seperating dx and dy]
Find the equation of the curve passing through the (0, –2) given that at any point (x, y) on the curve the product of the slope of its tangent and y-co-ordinate of the point is equal to the x-co-ordinate of the point.
A hostel has 100 students. On a certain day (consider it day zero) it was found that two students are infected with some virus. Assume that the rate at which the virus spreads is directly proportional to the product of the number of infected students and the number of non-infected students. If the number of infected students on 4th day is 30, then number of infected studetns on 8th day will be ______.
