In the given figure, is shown a sector O...

In the given figure, is shown a sector OAP of a circle with centre 0, containing ` /_ theta`. AB is perpendicular to the radius OA and meets OP produced at B. Prove that the perimeter of shaded region is `r[tan theta + sec theta + pi theta/180 - 1]`

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Figure shows a sector of a circle,centre O, containing an angle theta. Prove that ( i) Perimeter of the shaded region is r(tan theta+sec theta+(pi theta)/(180)-1)( ii) Area of shaded region is (r^(2))/(2)(tan theta-pi(theta)/(180))

Figure shows a sector of a circle of radius r containing an angle theta^(@) The area of the sector is Acm^(2) and the perimeter is 50cm. Prove that theta=(360)/(pi)((25)/(r)-1) and A=25r-r^(2)

Fig. 15.17, shows a sector of a circle, centre O , containing an angle thetao , prove that: (FIGURE) (i) Perimeter of the shaded region is r\ (tantheta+sectheta+(pitheta)/(180)-1) (ii) Area of the shaded region is (r^2)/2\ (tantheta-(pitheta)/(180))

In the given figure, AB and PQ are perpendicular diameters of the circle whose centre is O and radius OA = 7 cm. Find the area of the shade region.

Eliminate theta between the equation a sec theta + b tan theta + c=0 and p sec theta + q tan theta + r=0

Eliminate theta from the equations a sec theta+b tan theta+c=0 and p sec theta+q tan theta+r=0

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In the diagram as shown, a circle is drawn with centre C(1, 1) and radius I and a line L. The line Lis tangential to the circle at Q. Further L meet the y-axis at R and the x-axis at Pis such a way that the angle OPQ equals theta where 0 < theta

In the given figure ,If angleACB=theta and tan theta=1/2 then the relation between x , a , and b is

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