Exams
Subjects
Classes
Home
Exams
Analytical Ability
Vocabulary
fill in the blank with th...
Question:
medium
Fill in the blank with the right word: I want to buy sufficient __ for my office.
Show Hint
Stationery is for Paper and Letters. Stationary is like a parked car.
AP ECET BSc Mathematics - 2026
AP ECET BSc Mathematics
Updated On:
Jul 3, 2026
glossary
grocery
stationary
stationery
Show Solution
The Correct Option is
D
Solution and Explanation
Download Solution in PDF
Was this answer helpful?
0
Top Questions on Vocabulary
Choose the word which best expresses the meaning of the underlined word.
The manager showed great
pragmatism
while resolving the conflict at work.
BITSAT - 2025
English
Vocabulary
View Solution
The manager’s decision to fire the employee was seen as a __________ act of revenge rather than a professional choice.
SNAP - 2024
General Aptitude
Vocabulary
View Solution
Despite his repeated failures, the entrepreneur remained __________ in his pursuit of success.
SNAP - 2024
General Aptitude
Vocabulary
View Solution
A hater of learning and knowledge.
JEECUP - 2024
English
Vocabulary
View Solution
Want to practice more? Try solving extra ecology questions today
View All Questions
Questions Asked in AP ECET BSc Mathematics exam
The integrating factor of $x \cos x \frac{dy}{dx} + (x \sin x + \cos x) y = 1$ is}
AP ECET BSc Mathematics - 2026
Differential equations
View Solution
If $y = y(x)$ is the solution of $\left(\frac{2 + \sin x}{y + 1}\right) \frac{dy}{dx} + \cos x = 0$ with $y(0) = 1$, then $y\left(\frac{\pi}{2}\right) = $
AP ECET BSc Mathematics - 2026
Differential equations
View Solution
The solution of $y^{4}dx + 2xy^{3}dy = \frac{ydx - xdy}{x^{3}y^{3}}$ is}
AP ECET BSc Mathematics - 2026
Differential equations
View Solution
Which of the following is an integrating factor of $(x^{2} + y^{2} + 2x)dx + 2ydy = 0$?
AP ECET BSc Mathematics - 2026
Differential equations
View Solution
The differential equation $\frac{dy}{dx} = \frac{-(x + x^{8} + py^{2})}{y^{8} - y + qxy}$ is exact if}
AP ECET BSc Mathematics - 2026
Differential equations
View Solution