Rinku was very happy to receive a fancy jumbo pencil

Case study from CBSE sample paper Basic math 2024 – 2025 class 10

Case study 3:- Rinku was very happy to receive a fancy jumbo pencil from his best friend Rohan on his birthday. Pencil is a basic writing tool, when sharpened its shape is a combination of cylinder & cone as given in the picture. Cylindrical pencil with conical head is a common shape worldwide since ages. Commonly pencils are made up of wood & plastic but we should promote pencils made up of eco-friendly material (many options available in the market these days) to save environment.

The dimensions of Rinku’s pencil are given as follows:

Length of cylindrical portion is 21cm. Diameter of the base is 1 cm and height of the conical portion is 1.2 cm

Based on the above information, answer the following questions:

(i) Find the slant height of the sharpened part. [1 marks]

(ii) Find curved surface area of sharpened part (in terms of 𝜋). [1 marks]

(iii) (A) Find the total surface area of the pencil (in terms of 𝜋). [2 marks]

(iii)(B) The pencil’s total height decreases by 8.2 cm after sharpening it many times, what is the volume of the cylindrical part of the shortened pencil (in terms of 𝜋) ? [2 marks]

Solution :- Length of cylindrical portion (H) = 21cm

Diameter of the base(2r) = 1 cm ⇒ r = 0.5 cm

height of the conical portion (h) =1.2 cm

(i) the slant height of the sharpened part $l = \sqrt{r^2 + h^2}$

⇒ $l = \sqrt{(0.5)^2 + (1.2)^2} = \sqrt{0.25 + 1.44}$

⇒ $l = \sqrt{1.69} = 1.3$ cm

(ii) The curved surface area of sharpened part (in terms of 𝜋) = πrl

A = π(0.5)(1.3) = 0.65π cm²

(iii) The total surface area of the pencil (in terms of 𝜋)

= C.S.A. of conical part + C.S.A. of cylinder + Area of circle

= πrl + 2πrH + πr²

= 0.65 π + 2 π(0.5)(21) + π(0.5)²

= 0.65 π + 21 π + 0.25 π

= 21.9 π cm²

(iii) (B) The pencil’s total height decreases by 8.2 cm after sharpening it many times

Remaining height of the cylendrical part of pencil = 21 – 8.2 = 12.8 cm

Volume of remaining part of pencil = $\pi r^2 H + \dfrac{1}{3}\pi r^2 h$

= $\pi (0.5)^2 (12.8) + \dfrac{1}{3}\pi (0.5)^2 (1.2)$

= 3.2 π + 0.1 π = 3.3 π cm³

Case study 2:- Radha an aspiring landscape designer is tasked with creating a visually captivating pool design that incorporates a unique arrangement of fountains. The challenge entails arranging the fountains in such a way that when water is thrown upwards, it forms the shape of a parabola. The graph of one such parabola is given below.

𝑝(𝑥) = −𝑥² + 5𝑥 − 4.

Based on the above information, answer the following questions:

(i) Find the zeroes of the polynomial p(x) from the graph [1 marks]

(ii) Find the value of x at which water attains maximum height. [1 marks]

(iii)(A) If h is the maximum height attained by the water stream from the water level of the pool, then find the value of h. [2 marks]

(iii)(B) At what point(s) on x- axis, the height of water above x- axis is 2 m? [2 marks]

Solution:- See full solution

Case study 1:- A group of students conducted a survey to find out about the preferred mode of transportation to school among their classmates. They surveyed 200 students from their school. The results of the survey are as follows:

120 students preferred to walk to school.

25% of the students preferred to use bicycles.

10% of the students preferred to take the bus.

Remaining students preferred to be dropped off by car.

Based on the above information, answer the following questions:

(i) What is the probability that a randomly selected student does not prefer to walk to school ?

(ii) Find the probability of a randomly selected student who prefers to walk or use a bicycle.

(iii) (A) One day 50% of walking students decided to come by bicycle. What is the probability that a randomly selected student comes to school using a bicycle on that day?

(iii) (B) What is the probability that a randomly selected student prefers to be dropped off by car?

Solution:- See full solution

Case study of CBSE standard math 2022 – 2023 class 10

Case study 1:- The discus throw is an event in which an athlete attempts to throw a discus. The athlete spins anti-clockwise around one a half times through a circle, then release the throw,. When released, the discus travels along tangent to the circular spin orbit.

In the given figure, AB is one such tangent to a circle of radius 75 cm. Point O is a centre and ∠ABO = 30º. PQ is parallel to OA.

Based on above information:

(a) Find the length of AB. [1 marks]

(b) Find the length of OB. [1 marks]

(c) Find the lenth of AP. [2 marks]

Find the length of PQ.

Solution:- See full solution

Case study of CBSE standard math 2022 – 2023 class 10

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