General
General
Easy
Question
What is the synonym of award
- Gifting
- Accolade
- Golden
- Donate
The correct answer is: Accolade
Answer is b
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What is the plural possessive form of the highlighted word?
highways roads
What is the plural possessive form of the highlighted word?
highways roads
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General
Identify the indirect object in the sentence
Reem threw book on me.
Identify the indirect object in the sentence
Reem threw book on me.
GeneralGeneral
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Which is the adverb ?
Which is the adverb ?
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What is the antonym of ‘Imagery’
What is the antonym of ‘Imagery’
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What is the antonym of talkative
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Identify sentence with appositives
Identify sentence with appositives
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Which part of speech does the underlined word belongs to
Her effervescent personality appeals to everyone
Which part of speech does the underlined word belongs to
Her effervescent personality appeals to everyone
Maths-General
General
What is the synonym of the underlined word
Alice is emulating the rabbit.
What is the synonym of the underlined word
Alice is emulating the rabbit.
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what is the meaning of the phrasal verb ‘sort out’
what is the meaning of the phrasal verb ‘sort out’
Maths-General
General
What is the synonym of staying?
What is the synonym of staying?
GeneralGeneral
General
What is the synonym of fraught?
What is the synonym of fraught?
GeneralGeneral
General
Identify the adverb IN the sentence.
The beautiful horse galloped away
Identify the adverb IN the sentence.
The beautiful horse galloped away
GeneralGeneral
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The one that tells the story is called
The one that tells the story is called
Maths-General
General
What is the past tense of dig?
What is the past tense of dig?
GeneralGeneral
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Write and solve an absolute value equation for the minimum and maximum times for an object moving at the given speed to travel the given distance.
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)
Write and solve an absolute value equation for the minimum and maximum times for an object moving at the given speed to travel the given distance.
![](data:image/png;base64,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)
Maths-General