What kind of professional opportunities are available in the field of Arts ?
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Solution and Explanation
Correct Answer: The field of Arts offers a wide variety of careers.
Step 1: Overview
The Arts field includes literature, music, visual arts, theatre, and social sciences. It provides creative and academic career options across multiple sectors.
Step 2: Teaching and Research
Many Arts graduates pursue teaching and research careers, becoming professors, lecturers, or scholars who contribute to academia and intellectual growth.
Step 3: Civil Services
Arts students often prepare for government positions through UPSC and State PSC exams, joining services like IAS, IPS, or IFS, contributing to national administration.
Step 4: Media and Communication
Opportunities in journalism, content writing, advertising, broadcasting, and public relations allow Arts graduates to engage in creative storytelling and communication.
Step 5: Creative Arts
Artists may pursue careers in painting, fashion, photography, animation, or design. These professions combine creativity with entrepreneurship and innovation.
Step 6: Tourism and Hospitality
Arts graduates can work in tourism, hospitality, and event management, contributing to travel promotion and cultural exchange.
Step 7: Law and Social Work
Graduates may enter law, NGOs, and social services as advocates, activists, or counselors, working toward justice and community welfare.
\[ \text{The Arts field offers careers in teaching, media, government, creative arts, and social service.} \]
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Questions Asked in Maharashtra Class X Board exam
Complete the following activity to prove that the sum of squares of diagonals of a rhombus is equal to the sum of the squares of the sides.
Given: PQRS is a rhombus. Diagonals PR and SQ intersect each other at point T.
To prove: PS\(^2\) + SR\(^2\) + QR\(^2\) + PQ\(^2\) = PR\(^2\) + QS\(^2\)
Activity: Diagonals of a rhombus bisect each other.
In \(\triangle\)PQS, PT is the median and in \(\triangle\)QRS, RT is the median.
\(\therefore\) by Apollonius theorem,
\[\begin{aligned} PQ^2 + PS^2 &= \boxed{\phantom{X}} + 2QT^2 \quad \dots \text{(I)} \\ QR^2 + SR^2 &= \boxed{\phantom{X}} + 2QT^2 \quad \dots \text{(II)} \\ \text{Adding (I) and (II),} \quad PQ^2 + PS^2 + QR^2 + SR^2 &= 2(PT^2 + \boxed{\phantom{X}}) + 4QT^2 \\ &= 2(PT^2 + \boxed{\phantom{X}}) + 4QT^2 \quad (\text{RT = PT}) \\ &= 4PT^2 + 4QT^2 \\ &= (\boxed{\phantom{X}})^2 + (2QT)^2 \\ \therefore \quad PQ^2 + PS^2 + QR^2 + SR^2 &= PR^2 + \boxed{\phantom{X}} \\ \end{aligned}\]
- Maharashtra Class X Board - 2025
- Quadrilaterals
- Prove that tangent segments drawn from an external point to a circle are congruent.
- Draw a circle with radius 4.1 cm. Construct tangents to the circle from a point at a distance 7.3 cm from the centre.
- Maharashtra Class X Board - 2025
- Constructions
- \(\triangle\)ABC \(\sim\) \(\triangle\)PQR. In \(\triangle\)ABC, AB = 3.6 cm, BC = 4 cm and AC = 4.2 cm. The corresponding sides of \(\triangle\)ABC and \(\triangle\)PQR are in the ratio 2 : 3, construct \(\triangle\)ABC and \(\triangle\)PQR.
- Maharashtra Class X Board - 2025
- Constructions
- \(\square\)ABCD is a rectangle. Taking AD as a diameter, a semicircle AXD is drawn which intersects the diagonal BD at X. If AB = 12 cm, AD = 9 cm, then find the values of BD and BX.