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AIEEE 2010 Cutoff Marks AIEEE Cutoff Marks Expected Rank in AIEEE 2010 380 and Above 1-10 350 – 379 11-100 325 – 349 101-500 300 – 324 500-1000 280 – 299 1000-2000 250 -279 2000-5000 220 – 249 5000-10000 195 – 219 ...
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if f(x)= log( 1+x/1-x ) ; g(x) = log( 3x+x3/1+3x2 ) then find f(g(x)) in terms of f(x). 1) -f(x) 2) 3f(x) 3) [f(x)]3 4) -3f(x) ...
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let ABC be an acute angled triangle whose orthocentre at H. altitude from A is produced to meet circumcircle of the triangle ABC at D. then the distance HD is.....?? ...
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let ABC be an acute angled triangle whose orthocentre at H. altitude from A is produced to meet circumcircle of the triangle ABC at D. then the distance HD is.....?? ...
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P is an external point of the circle S=0 , n number of transversals are drawn from P to meet the circle S=0 in n pairs of points say (A1B1)(A2B2)......(AnBn) and power of the point P with respect to the circle S=0 is k then t ...
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*Image* [.] denotes the greatest integer function ...
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the centres of two circles C1 and C2 each of unit radius are at a distance 6 units from each other. let P be the midpoint of the line segment joining the centres of C1 and C2 and C be a circle touching circles C1 and C2 exter ...
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*Image* ...
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the fraction exceeding its Pth power by the greatest number possible where P≥2 is...... ans: ( 1/P ) 1/P-1 ...
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in a ΔABC , radii of escribed circles are r1, r2 , r3 and radius of incircle is r. 1) A(z1) ; B(z2) ; C(z3) are the vertices of a ΔABC in argand plane and │z1-α│=│z2-α│=│z3-α│=8 then r1+r2+r3-r is...... 2) in ...
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let each of circles S1≡x2+y2+4y-1=0 S2≡x2+y2+6x+y+8=0 S3≡x2+y2-4x-4y-37=0 touches the other two. let P1,P2,P3 be the point of contact of S1 and S2, S2 and S3, S3 and S1 respectively. let T be the point of concurrence of ...
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in triangle ABC , the incentre is I(1,0). equations of the lines AI , BI, CI are given by x=1 , y+1=x , x+3y=1 respectivly. and cot(A/2)=2 1) eqn of locus of centroid of ΔABC is....... 2) slope of BC is........ 3) if pt.A li ...
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the diagonals PR & QS of the quadrilatrl PQRS intersect at M and the areas of the triangles MPQ and MRS are 16 cm2 and 25 cm2 respectivly. let the min. possible area of the quadrilateral PQRS be A cm2 .then the sum of the squ ...
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let f(x) be a differentiable function satisfying (x-y)f(x+y)-(x+y)f(x-y)= 4xy(x2-y2) for all x,y belongs to R . f(1) = 1 then.... 1. the area of the region bounded by the curves y=f(x) and y=x2 is.... 2. the value of ∫-12 f ...
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lim ( n!/(mn)n )1/n n→∞ ...
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lim sin[cos x]/1+[cos x] x→0 where [.] is GIF.... ...
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ABC is a triangle inscribed in the circle z = r whre z is a complex no. and r is the radius of the circle. the internal bisector of angle A and the altitude from A on BC meet the circle at D and E respectively. F is the foot ...
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the value of ∫x2+2 /[(x4+5x2+4)tan-1(x2+2)/x dx ............. ...
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if x>0 and the fourth term in the expansoin of (1+3x/8)10 has maximum value ..then x lies in.......... ...
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if α,β are d roots of x2 -x-1 =0 and An = αn +βn then A.M of An-1 and An is ........... ...
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if α,β are d roots of ax2+ bx +c =0 den d roots of a(x+1)2+b(x+1)(x-2)+c(x-2)2=0 are...........?? ...
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wat z d value of ∫ sin x dx ...
