Exams
Subjects
Classes
Home
Exams
Social Science
Mineral and Energy Resources
name an oil field of indi...
Question:
medium
Name an oil field of India located in the Arabian Sea.
Show Hint
Mumbai High is an important source of offshore oil production in India, contributing significantly to the nation's oil supply.
CBSE Class X - 2025
CBSE Class X
Updated On:
Jan 13, 2026
Show Solution
Solution and Explanation
The
Mumbai High Oil Field
is a major oil field in the Arabian Sea, India. It's among India's largest oil fields.
Download Solution in PDF
Was this answer helpful?
0
Top Questions on Mineral and Energy Resources
Choose the correct option for the following States’ share (in percentage) in the production of ‘manganese’ in India from the highest to the lowest order.
CBSE Class X - 2024
Social Science
Mineral and Energy Resources
View Solution
How is energy a basic requirement for economic development of a country? Explain with examples.
CBSE Class X - 2024
Social Science
Mineral and Energy Resources
View Solution
Name the place where nuclear power plant is located in Uttar Pradesh.
CBSE Class X - 2025
Social Science
Mineral and Energy Resources
View Solution
Read the characteristics given in the box and identify the type of coal from the option given below:
This is low grade brown coal.
The principal reserves are in Neyveli in Tamilnadu.
It is soft with high moisture content.
CBSE Class X - 2025
Social Science
Mineral and Energy Resources
View Solution
Want to practice more? Try solving extra ecology questions today
View All Questions
Questions Asked in CBSE Class X exam
Express each number as a product of its prime factors:
\(140\)
\(156\)
\(3825\)
\(5005\)
\(7429\)
CBSE Class X
The Fundamental Theorem of Arithmetic
View Solution
Find the LCM and HCF of the following pairs of integers and verify that LCM × HCF = product of the two numbers.
\(26\)
and
\(91\)
\(510\)
\(\)
and
\(92\)
\(336\)
and
\(54\)
CBSE Class X
The Fundamental Theorem of Arithmetic
View Solution
Find the LCM and HCF of the following integers by applying the prime factorisation method.
\(12, 15\)
and
\(17, 23\)
and
\(8, 9\)
and
\(25\)
CBSE Class X
The Fundamental Theorem of Arithmetic
View Solution
Given that HCF
\((306, 657) = 9\)
, find LCM
\((306, 657)\)
.
CBSE Class X
The Fundamental Theorem of Arithmetic
View Solution
Check whether
\(6n\)
can end with the digit
\(0\)
for any natural number
\(n\)
.
CBSE Class X
The Fundamental Theorem of Arithmetic
View Solution