Unit 1: Trigonometric Functions-I




          Now let the point  P move  from its  original  position  in  anti–clockwise  direction. For  various   Notes
          positions  of  this  point  in  the  four  quadrants,  various  real  numbers  q  will  be  generated.  We
          summarise, the above discussion as follows. For values of q in the:

          I    quadrant, both x and y are positive.
          II   quadrant, x will be negative and y will be positive.
          III   quadrant, x as well as y will be negative.
          IV   quadrant, x will be positive and y will be negative.

                                               or
          I quadrant        II quadrant     III quadrant      IV quadrant.
          All positive      sin positive    tan positive      cos positive
          Cosec positive    cot positive    sec positive
          Where what is positive can be remembered by:
                            All         sin        tan        cos

          Quadrant         I            II         III        IV
          If (x, y) are the coordinates of a point P on a unit circle and q , the real number generated by the
          position of the point, then sin   = y and cos   = x. This means the coordinates of the point P can also
          be written as (cos  , sin   ) From Figure you can easily see that the values of x will be between –1
          and +1 as P moves on the unit circle. Same will be true for y also. Thus, for all P on the unit circle.





















          –1 < x > 1 and –1 < y > 1

          Thereby, we conclude that for all real numbers
          –1 < cos   > 1 and –1 < sin  > 1
          In other words, sin and cos   can not be numerically greater than 1
          Similarly, sec  = 1/ cos (   n /2)















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