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determine the position and nature of the double points on the curve to X ki power 4 minus y cube minus 12 y square - 4 x square - 2 equals to zero |
Answer» The POSITION and nature of the double points on the curve to X ki power 4 MINUS y cube minus 12 y square - 4 x square - 2 EQUALS to zeroStep-by-step explanation:
d2f/dx2 = 24x2-8 d2f/dy2 = -48y-24 Now need to calculate of the position of double point on the curve df/dx = 0 8x3-8x = 0 8x2-8 = 0 x = (1,0) To use y as first derivative: df/dy = 0 -24y2-24y = 0 -24y-24 = 0 y = (-1,0) Now use second derivative x and y d2f/dx2 = 24x2-8 now if x = 0 then: d2f/dx2 = -8 The point maximum is 0 If we put x = 1 then: d2f/dx2 = 16 The point minimum is = 1 Now for the derivative y is d2f/dx2 = -48y2-24 now putting value of y = 0 d2y/dx2 = -24 The point maximum will y = 0 If we put y = 1 then d2f/dx2 = 24 the point minimum for x = 1 Hence it proved that the position of double point on the curve is to be 1,0 and -1,0 The nature will be x = 0 and x = 1 for y is y = 0 and y = 1 Learn more : Derivatives brainly.in/question/19285653 |
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