Solve` (2y^2-4x+5)dx=(y-2y^2-4xy)dy`
Concept: Particular Integrals of Differential Equation
Solve `(D^3+D^2+D+1)y=sin^2x`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Solve the ODE `(D-1)^2 (D^2+1)^2y=0`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Evaluate `int_0^1( x^a-1)/log x dx`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Solve `(1+x)^2(d^2y)/(dx^2)+(1+x)(dy)/(dx)+y=4cos(log(1+x))`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Find the length of cycloid from one cusp to the next , where `x=a(θ + sinθ) , y=a(1-cosθ)`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Solve `(D^2-3D+2) y= 2 e^x sin(x/2)`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Using D.U.I.S prove that `int_0^∞ e^-(x^+a^2/x^2) dx=sqrtpi/2 e^(-2a), a> 0`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Evaluate `int_0^1int_0^( 1-x)1int_0^( 1-x-y) 1/(x+y+z+1)^3 dx dy dz`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Find the mass of the lemniscate 𝒓𝟐=𝒂𝟐𝒄𝒐𝒔 𝟐𝜽 if the density at any point is Proportional to the square of the distance from the pole .
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Solve` x^2 (d^3y)/dx^3+3x (d^2y)/dx^2+dy/dx+y/x=4log x`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Solve by method of variation of parameters :`(D^2-6D+9)y=e^(3x)/x^2`
Concept: Method of Variation of Parameters
Solve `(D^2-7D-6)y=(1+x^2)e^(2x)`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Apply Rungee Kutta method of fourth order to find an approximate Value of y when x=0.4 given that `dy/dx=(y-x)/(y+x),y=1` 𝒚=𝟏 𝒘𝒉𝒆𝒏 𝒙=𝟎 Taking h=0.2.
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Solve by variation of parameters` ((d^2y)/dx^2+1)y=1/(1+sin x)`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Compute the value of `int _0.2^1.4 (sin x - In x+e^x) ` Trapezoidal Rule (ii) Simpson’s (1/3)rd rule (iii) Simpson’s (3/8)th rule by dividing Into six subintervals.
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Using beta functions evaluate `int_0^(pi/6) cos^6 3θ.sinθ dθ`
Concept: Particular Integrals of Differential Equation
Evaluate `int_0^(a/sqrt2) int_y^(sqrt(a2-y^2)) log (x^2+y^2) "dxdy by changing to polar Coordinates".`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Evaluate `int int int x^2` `yzdzdydz`over the volume bounded by planes x=0, y=0, z=0 and `x/a+y/b+z/c=1`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Evaluate `int_0^inftye^(x^3)/sqrtx dx`
Concept: Linear Differential Equation with Constant Coefficient‐ Complementary Function
Semester 2 (FE First Year) Applied Mathematics 2 can be very challenging and complicated. But with the right ideas and support, you will be able to make it work. That’s why we have the semester 2 (fe first year) Applied Mathematics 2 important questions with answers pdf ready for you. All you need is to acquire the PDF with all the content and then start preparing for the exam. It really helps and it can bring in front an amazing experience every time if you're tackling it at the highest possible level.
Applied Mathematics 2 exams made easy
We make sure that you have access to the important questions for Semester 2 (FE First Year) Applied Mathematics 2 B.E. University of Mumbai. This way you can be fully prepared for any specific question without a problem. There are a plethora of different questions that you need to prepare. And that's why we are covering the most important ones. They are the questions that will end up being more and more interesting and the results themselves can be staggering every time thanks to that. The quality itself will be quite amazing every time, and you can check the important questions for Semester 2 (FE First Year) Applied Mathematics 2 University of Mumbai whenever you see fit.
The important questions for Semester 2 (FE First Year) Applied Mathematics 2 2021 we provide on this page are very accurate and to the point. You will have all the information already prepared and that will make it a lot simpler to ace the exam. Plus, you get to browse through these important questions for Semester 2 (FE First Year) Applied Mathematics 2 2021 B.E. and really see what works, what you need to adapt or adjust and what still needs some adjustment in the long run. It's all a matter of figuring out these things and once you do that it will be a very good experience.
All you have to do is to browse the important questions for upcoming University of Mumbai Semester 2 (FE First Year) 2021 on our website. Once you do, you will know what needs to be handled, what approach works for you and what you need to do better. That will certainly be an incredible approach and the results themselves can be nothing short of staggering every time. We encourage you to browse all these amazing questions and solutions multiple times and master them. Once you do that the best way you can, you will have a much higher chance of passing the exam, and that's what really matters the most!
