Vidyamanohar

Friday, June 06, 2014

Puzzle 50 - Integration

Evaluate
$\int {\frac{{1 - 7{{\cos }^2}x}}{{{{\sin }^7}x{{\cos }^2}x}}dx}$

Monday, May 26, 2014

A rectangular sheet of paper ABCD is with width AD=1 and length AB more than the width but not more than double of it. The paper is folded through vertex A so that the edge along AD falls onto AB. Without unfolding, the paper is folded again along a line through B so that CB now lies on AB. Now the result is a triangular piece of paper. There is a region on this triangular sheet that has four layers of paper. Find the area of that region in terms of the length x, of the rectangle.

Saturday, May 24, 2014

Puzzle 48 - Roots of a cubic

From Rolle’s theorem, we can conclude that between every pair of distinct roots of a polynomial P(x), there lies a root of its derivative P’(x). If P’(x) keeps its sign unchanged between any two distinct real numbers, then it is possible that P(x) does not have a root between them and hence may keep the same sign between those real numbers. Further if P(x) has two equal roots, then it will have a common root with its derivative. Consider $P(x) = 8{x^3} - 12(k + 3){x^2} + 72kx - 32$ with $k$ being an integer between $-2$ and $8$ both inclusive, then find the number of values of $k$ if $P(x) = 0$ has to have
(i) one real root and two complex roots, (ii) only two equal roots

Thursday, May 02, 2013

Puzzle 47

Semi circles are drawn on each side of a square. An elastic band is stretched tightly around the shape formed (see the figure). Find the length of the elastic band in terms of the length x, of the side of the square.

Thursday, April 25, 2013

Puzzle 46 - Squares

Square ABCD, of side length 26, is centered at O. With D as center, draw another square EFGH with side length 22, none of its sides parallel to those of ABCD, so that OE is kept perpendicular to DA. Find the area of the square ABCD that is not inside the square EFGH.

Tuesday, April 23, 2013

Puzzle 45 - Similar Triangles

Let A is the set of all triangles in a plane. Define a function $f:A \times A \to {R^ + }$ as $f\left( {{T_1},\,{T_2}} \right) = a$ implies that triangle ${T_2}$ is similar to ${T_1}$ with the dilation constant or scale factor ‘a’. Find all the possible triangles ${T_1}$ and ${T_2}$ such that

a. Lengths of the sides of ${T_1}$ and ${T_2}$ are integers
b. The perimeter and area of ${T_2}$ are same.

Monday, April 22, 2013

Puzzle 44

W(a, b) is the centre of the circle. TE is a tangent to the circle at E, which lies on the y-axis. The circle touches the x-axis at D. The equation of TE is $y = \frac{3}{4}x - 9$ . Calculate the values of a and b.