Maths-
General
Easy

Question

The transformed equation of x squared over a squared minus y squared over b squared equals 1 when the axes are rotated through an angle 90° is

  1. straight x squared over straight a squared minus straight Y squared over straight b squared equals 1
  2. straight X squared over straight a squared plus straight Y squared over straight b squared equals 1
  3. straight Y squared over straight b squared minus straight X squared over straight a squared equals 1
  4. straight Y squared over straight a squared minus straight X squared over begin display style b end style squared equals 1

hintHint:

Find the corresponding coordinate changes of a variable and substitute in the main equation.

The correct answer is: straight Y squared over straight a squared minus straight X squared over begin display style b end style squared equals 1


    Given That:
    The transformed equation of x squared over a squared minus y squared over b squared equals 1 when the axes are rotated through an angle 90° is
    >>> X equals x cos theta space plus space y sin theta
Y equals negative x sin theta plus y cos theta
    >>> X equals y
Y equals negative x
    >>> Therefore, the equation becomes y squared over a squared minus x squared over b squared=1.

    X equals y
Y equals negative x
    >>> Therefore, the equation becomes y squared over a squared minus x squared over b squared=1.

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