General
General
Easy
Question
Choose the negative adjectives starting with ' u '
- Unattractive
- Alter
- Urban
- Useful
The correct answer is: Unattractive
Correct answer a) unattractive.
Explanation-Negative adjectives are the word that explains / pronounce negatively.
Related Questions to study
Maths-
Describe the possible values of x.
![](data:image/png;base64,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)
Describe the possible values of x.
![](data:image/png;base64,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)
Maths-General
Maths-
Write the solutions to the given equation.
Rewrite them as the linear-quadratic system of equations and graph them to solve.
![x squared plus 1 equals x plus 3](data:image/png;base64,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)
Write the solutions to the given equation.
Rewrite them as the linear-quadratic system of equations and graph them to solve.
![x squared plus 1 equals x plus 3](data:image/png;base64,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)
Maths-General
Maths-
Describe the possible lengths of the third side of the triangle given the lengths of the other two sides.
5 inches, 12 inches
Describe the possible lengths of the third side of the triangle given the lengths of the other two sides.
5 inches, 12 inches
Maths-General
General
Identify the common noun in the given sentence
"The mice are afraid of a cat"
Identify the common noun in the given sentence
"The mice are afraid of a cat"
GeneralGeneral
Maths-
How many solutions does the given system of equations have?
y=x & y=x2
How many solutions does the given system of equations have?
y=x & y=x2
Maths-General
Maths-
How can you determine whether the relationship between side length and area is a function?
![](data:image/png;base64,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)
If it is a function, say whether it is linear or non linear function ?
There are other ways to determine whether a function is linear or not, like, checking if the slope is equal between each of the points or if the equation can be written in the form of y = ax + b, where a and b are constants.
How can you determine whether the relationship between side length and area is a function?
![](data:image/png;base64,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)
If it is a function, say whether it is linear or non linear function ?
Maths-General
There are other ways to determine whether a function is linear or not, like, checking if the slope is equal between each of the points or if the equation can be written in the form of y = ax + b, where a and b are constants.
Maths-
A 10,000 gallon swimming pool needs to be emptied. Exactly 2000 gallons have already been pumped out of the pool and into the tanker. How can you determine how long it will take to pump all of the water into the tanker. 720 gallons per hour can be emptied from the pool.
A 10,000 gallon swimming pool needs to be emptied. Exactly 2000 gallons have already been pumped out of the pool and into the tanker. How can you determine how long it will take to pump all of the water into the tanker. 720 gallons per hour can be emptied from the pool.
Maths-General
General
Identify proper noun in the given sentence
Anubha is a wonderful lady?
Identify proper noun in the given sentence
Anubha is a wonderful lady?
GeneralGeneral
Maths-
A line can intersect a parabola maximum of ___.
A line can intersect a parabola maximum of ___.
Maths-General
General
Choose the simple subject in the given sentence.
"My little brother broke his fingers".
Choose the simple subject in the given sentence.
"My little brother broke his fingers".
GeneralGeneral
General
Choose the correct spelling word, to form a logic sentence
"The is in the center of our solar system”
Choose the correct spelling word, to form a logic sentence
"The is in the center of our solar system”
GeneralGeneral
General
Identify the type of Sentence: " She smiles when she is happy".
Identify the type of Sentence: " She smiles when she is happy".
GeneralGeneral
Maths-
Sketch the following line on a graph: y = 8/9 x - 6
Sketch the following line on a graph: y = 8/9 x - 6
Maths-General
Maths-
Sketch the following line on a graph: y = 3/2 x + 4
Sketch the following line on a graph: y = 3/2 x + 4
Maths-General
Maths-
Sketch the following line on a graph: ![Y equals fraction numerator 3 x over denominator 4 end fraction minus 3](data:image/png;base64,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)
Sketch the following line on a graph: ![Y equals fraction numerator 3 x over denominator 4 end fraction minus 3](data:image/png;base64,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)
Maths-General