From the differential equation that repr...

From the differential equation that represents all parabolas each of which has a latus rectum 4a, and whose axes are parallel to the x-axis .

Text Solution

Verified by Experts

The correct Answer is:

` 2ay_(2) + y_(1)^(3) = 0`

Topper's Solved these Questions

ORDER AND DEGREE OF DIFFERENTIAL EQUATION
CHHAYA PUBLICATION|Exercise Sample Questions for Competitive Examination (A Multiple Correct Answers Type )|5 Videos
ORDER AND DEGREE OF DIFFERENTIAL EQUATION
CHHAYA PUBLICATION|Exercise Sample Questions for Competitive Examination ( B Integer Answer Type )|5 Videos
ORDER AND DEGREE OF DIFFERENTIAL EQUATION
CHHAYA PUBLICATION|Exercise EXERCISE (Very Short Answer Type Questions )|9 Videos
MISCELLANEOUS EXAMPLES
CHHAYA PUBLICATION|Exercise WBJEE 2026|23 Videos
PARABOLA
CHHAYA PUBLICATION|Exercise Sample Questions for Competitive Exams ( E Assertion -Reason Type )|2 Videos

Similar Questions

Explore conceptually related problems

The differential equation of all parabolas each of which has a latus rectum 4a and whose axes are parallel to the x-axis is (a) of order 1 and degree 2 (b) of order 2 and degree 3 (c) of order 2 and degree 1 (d) of order 2 and degree 2

The equation y^(2)+4x+4y+k=0 represents a parabola whose latus rectum is

The differential equation of all parabolas whose axes are parallel to y-axis is

Find the differential equation of all parabolas whose axis are parallel to the x-axis.

The differential equation of all parabolas whose axis are parallel to the y-axis is

The differential equation of all parabolas whose axis are parallel to y-axis is -

The equation y^(2) + 4x + 4y + k = 0 represents a parabola whose latus rectum is _

y^2+2y-x+5=0 represents a parabola. Find equation of latus rectum.

Form the differential equation representing the family of parabolas having vertex at origin and axis along positive direction of x-axis.

The order of the differential equation of all paraboles whose axis of symmetry along x-axis is

CHHAYA PUBLICATION-ORDER AND DEGREE OF DIFFERENTIAL EQUATION -EXERCISE ( Short Answer Type Questions )

x = e^(-t) (a cos t + b sin t )
Text Solution
|
(y -b)^(2) = 4k (x - a)
Text Solution
|
Eliminate a and b, y = a sec x + b tan x
Text Solution
|
xy =Ae^(x) + Be^(-x)
Text Solution
|
Show that the differential equation x (yy(2) + y(1)^(2)) = yy(1) is ...
Text Solution
|
Show that , the solution x = A cos (nt + B) + (k)/(n^(2) - p^(2)) . S...
Text Solution
|
Show that , the solution x = e^(-kt) (a cos nt + b sin nt ), for all...
Text Solution
|
Show that the solution y = a sin x + b cos x + x sin x satisfies , ...
Text Solution
|
Show that , the equation of all circles touching the y-axis at the ori...
Text Solution
|
Find a differential equation which is satisfied by all curves y =...
Text Solution
|
Form the differential equation of the family of hyperbolas b^(2) x...
Text Solution
|
Determine the differential equation of the family of parabolas whose a...
Text Solution
|
From the differential equation of family of parabolas having vertex at...
Text Solution
|
From the differential equation of the family of circles (x -a)^(2)...
Text Solution
|
Show that the function y= A cos 2x - B sin 2x is a solution of the...
Text Solution
|
Form the differential equation of the family of circles having centre ...
Text Solution
|
From the differential representing the family of ellipses having centr...
Text Solution
|
From the differential equation of the family of circles in the second ...
Text Solution
|
From the differential equation that represents all parabolas each of w...
Text Solution
|
If a is a prameter , show that the differential equation of the fam...
Text Solution
|