Maths-
General
Easy
Question
Which of the following is equivalent to ![2 x open parentheses x squared minus 3 x close parentheses ?](data:image/png;base64,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)
Hint:
Hint:
Simplify the given equation to get equivalent equation
The correct answer is: ![2 x cubed minus 6 x squared](data:image/png;base64,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)
Explanation:
- We have given a expression
.
- We have to find the equivalent expression for the given expression.
- We will first use distributive property to solve this given expression
Step 1 of 1:
The given expression is ![2 x open parentheses x squared minus 3 x close parentheses](data:image/png;base64,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)
On further simplification we will get,
![equals 2 x left parenthesis x squared right parenthesis minus 2 x left parenthesis 3 x right parenthesis](data:image/png;base64,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)
![equals 2 x cubed minus 6 x squared](data:image/png;base64,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)
Hence, Option D is correct.
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Maths-
![](data:image/png;base64,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)
The table above shows two lists of numbers. Which of the following is a true statement comparing list A and list B?
![](data:image/png;base64,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)
The table above shows two lists of numbers. Which of the following is a true statement comparing list A and list B?
Maths-General
Maths-
Check if the number is rational or irrational for 83.396668…
Check if the number is rational or irrational for 83.396668…
Maths-General
Maths-
Check if the number is rational or irrational for
( Golden ratio)
Check if the number is rational or irrational for
( Golden ratio)
Maths-General
Maths-
![f left parenthesis x right parenthesis equals fraction numerator x plus 3 over denominator 2 end fraction](data:image/png;base64,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)
For the function f defined above, what is the value of f(-1)?
![f left parenthesis x right parenthesis equals fraction numerator x plus 3 over denominator 2 end fraction](data:image/png;base64,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)
For the function f defined above, what is the value of f(-1)?
Maths-General
Maths-
If ,
what is the value of 3x ?
If ,
what is the value of 3x ?
Maths-General
Maths-
Check if the number is rational or irrational for 89.402106106106106……..
Check if the number is rational or irrational for 89.402106106106106……..
Maths-General
Maths-
Find the equivalent fraction for the following decimal number 0.57894736842 and say whether it is a rational number or an irrational number?
Find the equivalent fraction for the following decimal number 0.57894736842 and say whether it is a rational number or an irrational number?
Maths-General
Maths-
what is the value of ![left parenthesis u minus t right parenthesis open parentheses u squared minus t squared close parentheses ?](data:image/png;base64,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)
what is the value of ![left parenthesis u minus t right parenthesis open parentheses u squared minus t squared close parentheses ?](data:image/png;base64,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)
Maths-General
Maths-
Jake buys a bag of popcorn at a movie theater. He eats half of the popcorn during the 15 minutes of previews. After eating half of the popcorn, he stops eating for the next 30 minutes. Then he gradually eats the popcorn until he accidentally spills all of the remaining popcorn. Which of the following graphs could represent the situation?
Jake buys a bag of popcorn at a movie theater. He eats half of the popcorn during the 15 minutes of previews. After eating half of the popcorn, he stops eating for the next 30 minutes. Then he gradually eats the popcorn until he accidentally spills all of the remaining popcorn. Which of the following graphs could represent the situation?
Maths-General
Maths-
A text messaging plan charges a flat fee of
per month for up to 100 text messages sent plus
for each additional text message sent that month. Which of the following graphs represents the cost, y , of sending texts in a month?
A text messaging plan charges a flat fee of
per month for up to 100 text messages sent plus
for each additional text message sent that month. Which of the following graphs represents the cost, y , of sending texts in a month?
Maths-General
Maths-
Explain whether the following are rational or irrational and justify it.
e (Euler’s number = 2.7182818284590452353602874713527)
Explain whether the following are rational or irrational and justify it.
e (Euler’s number = 2.7182818284590452353602874713527)
Maths-General
Maths-
Explain whether the following are rational or irrational and justify it.
![stack pi with _ below left parenthesis 3.1415926535897932384626433832795 right parenthesis with _ below](data:image/png;base64,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)
Explain whether the following are rational or irrational and justify it.
![stack pi with _ below left parenthesis 3.1415926535897932384626433832795 right parenthesis with _ below](data:image/png;base64,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)
Maths-General
Maths-
![table attributes columnalign right left right left right left right left right left right left columnspacing 0em 2em 0em 2em 0em 2em 0em 2em 0em 2em 0em end attributes row cell 2 x plus 3 y equals 1200 end cell row cell 3 x plus 2 y equals 1300 end cell end table](data:image/png;base64,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)
Based on the system of equations above, what is the value of 5x 5y?
![table attributes columnalign right left right left right left right left right left right left columnspacing 0em 2em 0em 2em 0em 2em 0em 2em 0em 2em 0em end attributes row cell 2 x plus 3 y equals 1200 end cell row cell 3 x plus 2 y equals 1300 end cell end table](data:image/png;base64,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)
Based on the system of equations above, what is the value of 5x 5y?
Maths-General
Maths-
A helicopter, initially hovering 40 feet above the ground, begins to gain altitude at a rate of 21 feet per second. Which of the following functions represents the helicopter's altitude above the ground y , in feet, t seconds after the helicopter begins to gain altitude?
A helicopter, initially hovering 40 feet above the ground, begins to gain altitude at a rate of 21 feet per second. Which of the following functions represents the helicopter's altitude above the ground y , in feet, t seconds after the helicopter begins to gain altitude?
Maths-General
Maths-
Juan purchased an antique that had a value of
at the time of purchase. Each year, the value of the antique is estimated to increase
over its value the previous year. The estimated value of the antique, in dollars, 2 years after purchase can be represented by the expression 200a,where a is a constant what is the value of a?
Juan purchased an antique that had a value of
at the time of purchase. Each year, the value of the antique is estimated to increase
over its value the previous year. The estimated value of the antique, in dollars, 2 years after purchase can be represented by the expression 200a,where a is a constant what is the value of a?
Maths-General