Last updated at Sept. 14, 2018 by
This is a question of CBSE Sample Paper - Class 12 - 2017/18.
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Transcript
Question 10 Verify that ax2 + by2 = 1 is a solution of the differential equation x(yy2 + y12) = yy1 Given ax2 + by2 = 1 First we find y1, and y2 Now, ax2 + by2 = 1 Differentiating w.r.t. x (ax2)β+ (by2)β = (1)β 2ax + 2by ππ¦/ππ₯ = 0 2ax + 2byy1 = 0 2(ax + byy1) = 0 ax + byy1 = 0 Now, finding y2 From (1) ax + byy1 = 0 ax + byππ¦/ππ₯ = 0 Differentiating w.r.t. x (ax)β + ("by" ππ¦/ππ₯)^β²= 0 a + b("y" ππ¦/ππ₯)^β²= 0 a + b(π¦^β² ππ¦/ππ₯+π¦π¦β²β²)= 0 a + b(π¦^β² π¦β²+π¦π¦β²β²)= 0 a + b(π¦1 π¦1+π¦π¦2)= 0 a + b(π¦1 π¦1+π¦π¦2)= 0 a + b(γπ¦_1γ^2+π¦π¦2)= 0 a = β b(γπ¦_1γ^2+π¦π¦2) Now, from (1) ax + byy1 = 0 Putting a = β b(γπ¦_1γ^2+π¦π¦2) from (2) β b(γπ¦_1γ^2+π¦π¦2)x + byy1 = 0 byy1 = b(γπ¦_1γ^2+π¦π¦2)x Cancelling b both sides yy1 = (γπ¦_1γ^2+π¦π¦2)x x(γπ¦_1γ^2+π¦π¦2) = yy1 Hence proved
CBSE Class 12 Sample Paper for 2018 Boards
Question 1 Important
Question 2 Important
Question 3
Question 4
Question 5
Question 6 Important
Question 7 Important
Question 8
Question 9 Important
Question 10 You are here
Question 11 Important
Question 12
Question 13 Important
Question 14 Important
Question 15
Question 16 Important
Question 17
Question 18 Important
Question 19
Question 20 Important
Question 21 Important
Question 22
Question 23
Question 24 Important
Question 25
Question 26 Important
Question 27
Question 28 Important
Question 29
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