Which Equation Is A Translation Of The Sentence Six Times P Squared Plus 12 Equals Q?A. $6 + 12p^2 = Q$B. $6p^2 + 12 = Q$C. $6p^2 \times 12 = Q$D. $6 \times 12p^2 = Q$

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Understanding Algebraic Translations

Algebraic translations are a crucial concept in mathematics, allowing us to rewrite and simplify complex equations. In this article, we will explore the translation of the sentence "Six times p squared plus 12 equals q" into an algebraic equation. We will examine each option and determine which one accurately represents the given sentence.

The Original Sentence

The original sentence is: "Six times p squared plus 12 equals q". This sentence can be broken down into its individual components:

  • "Six times" represents the multiplication of 6 by the expression inside the parentheses.
  • "p squared" represents the variable p raised to the power of 2.
  • "Plus 12" indicates the addition of 12 to the expression.
  • "Equals q" indicates that the resulting expression is equal to the variable q.

Option A: 6+12p2=q6 + 12p^2 = q

Option A is: 6+12p2=q6 + 12p^2 = q. This equation can be broken down as follows:

  • The term "6" is added to the expression 12p212p^2.
  • The resulting expression is set equal to the variable q.

However, this equation does not accurately represent the original sentence. The term "6" is not multiplied by the expression p2p^2, but rather added to it.

Option B: 6p2+12=q6p^2 + 12 = q

Option B is: 6p2+12=q6p^2 + 12 = q. This equation can be broken down as follows:

  • The term 6p26p^2 represents the multiplication of 6 by the variable p raised to the power of 2.
  • The term "12" is added to the expression 6p26p^2.
  • The resulting expression is set equal to the variable q.

This equation accurately represents the original sentence. The term "6" is multiplied by the expression p2p^2, and the term "12" is added to the resulting expression.

Option C: 6p2×12=q6p^2 \times 12 = q

Option C is: 6p2×12=q6p^2 \times 12 = q. This equation can be broken down as follows:

  • The term 6p26p^2 is multiplied by the term "12".
  • The resulting expression is set equal to the variable q.

However, this equation does not accurately represent the original sentence. The term "12" is not added to the expression 6p26p^2, but rather multiplied by it.

Option D: 6×12p2=q6 \times 12p^2 = q

Option D is: 6×12p2=q6 \times 12p^2 = q. This equation can be broken down as follows:

  • The term "6" is multiplied by the term "12p^2".
  • The resulting expression is set equal to the variable q.

However, this equation does not accurately represent the original sentence. The term "12" is not added to the expression p2p^2, but rather multiplied by it.

Conclusion

In conclusion, the correct translation of the sentence "Six times p squared plus 12 equals q" is option B: 6p2+12=q6p^2 + 12 = q. This equation accurately represents the original sentence, with the term "6" multiplied by the expression p2p^2 and the term "12" added to the resulting expression.

Understanding Algebraic Translations: Key Takeaways

  • Algebraic translations are a crucial concept in mathematics, allowing us to rewrite and simplify complex equations.
  • The original sentence "Six times p squared plus 12 equals q" can be broken down into its individual components.
  • Option B: 6p2+12=q6p^2 + 12 = q accurately represents the original sentence, with the term "6" multiplied by the expression p2p^2 and the term "12" added to the resulting expression.

Real-World Applications of Algebraic Translations

Algebraic translations have numerous real-world applications, including:

  • Science: Algebraic translations are used to model and solve complex scientific problems, such as the motion of objects and the behavior of electrical circuits.
  • Engineering: Algebraic translations are used to design and optimize complex systems, such as bridges and buildings.
  • Finance: Algebraic translations are used to model and analyze complex financial systems, such as stock markets and interest rates.

Common Mistakes to Avoid When Translating Algebraic Sentences

  • Misinterpreting the order of operations: When translating algebraic sentences, it is essential to follow the order of operations (PEMDAS) to ensure that the correct operations are performed.
  • Misinterpreting the use of parentheses: When translating algebraic sentences, it is essential to correctly interpret the use of parentheses to ensure that the correct expressions are evaluated.
  • Misinterpreting the use of variables: When translating algebraic sentences, it is essential to correctly interpret the use of variables to ensure that the correct expressions are evaluated.

Conclusion

Q: What is an algebraic translation?

A: An algebraic translation is a process of rewriting and simplifying complex equations by using mathematical operations such as addition, subtraction, multiplication, and division.

Q: Why are algebraic translations important?

A: Algebraic translations are important because they allow us to simplify complex equations and make them easier to solve. They also help us to understand the underlying structure of the equation and to identify patterns and relationships between variables.

Q: How do I know if an equation is a translation of a sentence?

A: To determine if an equation is a translation of a sentence, you need to follow these steps:

  1. Read the sentence carefully and identify the key words and phrases.
  2. Identify the mathematical operations and relationships between variables.
  3. Rewrite the sentence as an equation using mathematical notation.
  4. Check if the equation accurately represents the original sentence.

Q: What are some common mistakes to avoid when translating algebraic sentences?

A: Some common mistakes to avoid when translating algebraic sentences include:

  • Misinterpreting the order of operations (PEMDAS)
  • Misinterpreting the use of parentheses
  • Misinterpreting the use of variables
  • Failing to check if the equation accurately represents the original sentence

Q: How do I determine if an equation is a translation of a sentence?

A: To determine if an equation is a translation of a sentence, you need to follow these steps:

  1. Read the equation carefully and identify the key words and phrases.
  2. Identify the mathematical operations and relationships between variables.
  3. Check if the equation accurately represents the original sentence.
  4. If the equation does not accurately represent the original sentence, try rewriting it in a different form.

Q: What are some real-world applications of algebraic translations?

A: Some real-world applications of algebraic translations include:

  • Science: Algebraic translations are used to model and solve complex scientific problems, such as the motion of objects and the behavior of electrical circuits.
  • Engineering: Algebraic translations are used to design and optimize complex systems, such as bridges and buildings.
  • Finance: Algebraic translations are used to model and analyze complex financial systems, such as stock markets and interest rates.

Q: How do I practice algebraic translations?

A: To practice algebraic translations, you can try the following:

  • Start with simple equations and gradually move on to more complex ones.
  • Practice rewriting sentences as equations using mathematical notation.
  • Try solving equations and checking if they accurately represent the original sentence.
  • Use online resources and practice problems to help you improve your skills.

Q: What are some common algebraic translations?

A: Some common algebraic translations include:

  • Addition: a+b=ca + b = c
  • Subtraction: a−b=ca - b = c
  • Multiplication: a×b=ca \times b = c
  • Division: a÷b=ca \div b = c
  • Exponents: ab=ca^b = c

Q: How do I know if an equation is a translation of a sentence?

A: To determine if an equation is a translation of a sentence, you need to follow these steps:

  1. Read the equation carefully and identify the key words and phrases.
  2. Identify the mathematical operations and relationships between variables.
  3. Check if the equation accurately represents the original sentence.
  4. If the equation does not accurately represent the original sentence, try rewriting it in a different form.

Conclusion

In conclusion, algebraic translations are a crucial concept in mathematics, allowing us to rewrite and simplify complex equations. By understanding the correct translation of a sentence and avoiding common mistakes, we can better appreciate the importance of algebraic translations in real-world applications.