Consider M with `r=((2^199-1)sqrt2)/2^198`. The number of all those circle `D_n` that are inside M is

Consider M with r=1025/513 . Let k be the number of all those circle C_n that are inside M. Let l be the maximum possible number of circle amaong these k circles such that no two circle intersect .Then

A circle S of radius 'a' is the director circle of another circle S_(1),S_(1) is the director circle of circle S_(2) and so on.If the sum of the radii of all these circle is 2, then the value of 'a' is 2+sqrt(2)(b)2-(1)/(sqrt(2))2-sqrt(2)(d)2+(1)/(sqrt(2))

If (1+i)^(2n)+(1-i)^(2n)=-2^(n+1)(where,i=sqrt(-1) for all those n, which are

A rectangle with sides of lengths (2n-1) and (2m-1) units is divided into squares of unit length.The number of rectangles which can be formed with sides of odd length,is (a) m^(2)n^(2) (b) mn(m+1)(n+1) (c) 4^(m+n-1) (d) non of these

Consider an AP with a as the first term and d is the common difference such that S_(n) denotes the sum to n terms and a_(n) denotes the nth term of the AP. Given that for some m, n inN,(S_(m))/(S_(n))=(m^(2))/(n^(2))(nen) . Statement 1 d=2a because Statement 2 (a_(m))/(a_(n))=(2m+1)/(2n+1) .

Consider the relation 4l^(2)-5m^(2)+6l+1=0 , where l,m in R The number of tangents which can be drawn from the point (2,-3) to the above fixed circle are

The equation of four circles are (x+-a)^(2)+(y+-a^(2)=a^(2). The radius of a circle touching all the four circles is (sqrt(2)+2)a( b) 2sqrt(2)a(sqrt(2)+1)a(d)(2+sqrt(2))a

Three equal circles each of radius r touch one another.The radius of the circle touching all the three given circles internally is (2+sqrt(3))r(b)((2+sqrt(3)))/(sqrt(3))r((2-sqrt(3)))/(sqrt(3))r(d)(2-sqrt(3))r

Consider a circle x^(2)+y^(2)+ax+by+c=0 lying completely in the first quadrant .If m_(1) and m_(2) are maximum and minimum values of y//x for all ordered pairs (x,y) on the circumference of the circle, then the value of (m_(1)+m_(2)) is

If i^(2)=-1 and ((1+i)/(sqrt2))^(n)=((1-i)/(sqrt2))^(m)=1, AA n, m in N , then the minimum value of n+m is equal to