About Super 20 Sample Paper Mathematics Class 10
Super 20 Mathematics Sample Paper for class 10 is designed in accordance with the pattern specified by the CBSE for the Examination. This book consists of 20 Solved Different types of questions. These papers give you an idea about how your real Board Examination Question Paper will look in terms of difficulty level, marks distribution, sections, number & type of questions, time and duration.
Why to Practice Super 20 Mathematics Sample Paper?
Super 20 Mathematics Sample Papers help you to get into the real examtype feeling. As this question paper is exactly similar to the CBSE sample papers, you will find it very useful to analyze how much time you need to answer each question, what should be your writing strategy and how to finish it in given time. The more you practice, the more efficiency level you achieve. It matters a lot. Most of the time, you know the answers but you miss it only because of bad time management.
Students are advised to solve all these Sample Papers and refer their answers to the Marking Scheme to assess their level of preparation for CBSE Board Examination. All these questions are very important for forthcoming CBSE Board Examination.
Some Questions from Super 20 Sample Paper Mathematics Class 10

ABC is an Isosceles triangle right angled at c. Prove that AB2 = 2AC2. (1)

A tangent PQ at a point P of a circle of radius 5 cm meets a line through the centre O, at a point Q, so that OQ = 12 cm, then find length PQ. (1)

In a single throw of a pair of dice, find the probability of getting the sum is 9. (1)

The length of the minute hand of a clock is 14 cm. Find the area swept by the minute hand in 5 minutes. (1)

If the point P(x, y) is equidistant from the point A(3, 6) and B(–3, 4), prove that 3x + y – 5 = 0. (2)

A merchant has 120 litres of oil of one kind, 180 litres of another kind and 240 litres of third kind. He wants to sell the oil by filling the three kinds of oil in tins of equal capacity. What should be the greatest capacity of such a tin? (3)

Find the area of the triangle formed by joining the midpoints of the sides of the triangle whose vertices are A(2, 1), B(4, 3) and C(2, 5). (4)

A hemispherical depression is cut out from one face of a cubical wooden block of edge 21 cm, such that the diameter of the hemisphere is equal to the edge of the cube. Determine the volume and total surface area of the remaining block. (4)