Determine Between Which Two Integers The Number \[$\sqrt{30}\$\] Lies.---QUESTION 2Expand And Simplify:1. \[$(a-2)^2-a(a+4)\$\]2. \[$(2m-3)\left(4m^2+9\right)(2m+3)\$\]3. \[$(9x^2+12xy+16y^2)(3x-4y)\$\]4.

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Introduction

In this article, we will determine between which two integers the number 30\sqrt{30} lies. To do this, we will first find the square root of 30 and then compare it to the nearest integers.

Finding the Square Root of 30

The square root of a number is a value that, when multiplied by itself, gives the original number. In this case, we want to find the square root of 30.

30=30×1=30×1010=30010=30\sqrt{30} = \sqrt{30 \times 1} = \sqrt{30 \times \frac{10}{10}} = \sqrt{\frac{300}{10}} = \sqrt{30}

Comparing the Square Root of 30 to the Nearest Integers

To determine between which two integers the number 30\sqrt{30} lies, we need to compare it to the nearest integers. We can do this by finding the square of the nearest integers and comparing them to 30.

The nearest integers to 30\sqrt{30} are 5 and 6. Let's find the square of these integers and compare them to 30.

52=255^2 = 25 62=366^2 = 36

Since 25 is less than 30 and 36 is greater than 30, we can conclude that 30\sqrt{30} lies between 5 and 6.

Conclusion

In this article, we determined that the number 30\sqrt{30} lies between 5 and 6. We found the square root of 30 and compared it to the nearest integers to determine this.

Expanding and Simplifying Algebraic Expressions

Now that we have determined the value of 30\sqrt{30}, let's move on to expanding and simplifying algebraic expressions.

Expanding and Simplifying Expression 1

The first expression we need to expand and simplify is:

(a−2)2−a(a+4)(a-2)^2 - a(a+4)

To expand this expression, we need to use the distributive property and the FOIL method.

(a−2)2=a2−4a+4(a-2)^2 = a^2 - 4a + 4

a(a+4)=a2+4aa(a+4) = a^2 + 4a

Now, let's substitute these expressions back into the original expression.

(a−2)2−a(a+4)=(a2−4a+4)−(a2+4a)(a-2)^2 - a(a+4) = (a^2 - 4a + 4) - (a^2 + 4a)

Expanding and simplifying this expression, we get:

−8a+4-8a + 4

Expanding and Simplifying Expression 2

The second expression we need to expand and simplify is:

(2m−3)(4m2+9)(2m+3)(2m-3)(4m^2+9)(2m+3)

To expand this expression, we need to use the distributive property and the FOIL method.

(2m−3)(4m2+9)=8m3+18m−12m2−27(2m-3)(4m^2+9) = 8m^3 + 18m - 12m^2 - 27

(8m3+18m−12m2−27)(2m+3)=16m4+36m3−24m3−54m2+36m2+54m−54m−81(8m^3 + 18m - 12m^2 - 27)(2m+3) = 16m^4 + 36m^3 - 24m^3 - 54m^2 + 36m^2 + 54m - 54m - 81

Expanding and simplifying this expression, we get:

16m4+12m3−18m2−8116m^4 + 12m^3 - 18m^2 - 81

Expanding and Simplifying Expression 3

The third expression we need to expand and simplify is:

(9x2+12xy+16y2)(3x−4y)(9x^2+12xy+16y^2)(3x-4y)

To expand this expression, we need to use the distributive property and the FOIL method.

(9x2+12xy+16y2)(3x−4y)=27x3−36x2y+48xy2−36xy2+48xy−64y3(9x^2+12xy+16y^2)(3x-4y) = 27x^3 - 36x^2y + 48xy^2 - 36xy^2 + 48xy - 64y^3

Expanding and simplifying this expression, we get:

27x3−36x2y+12xy2+48xy−64y327x^3 - 36x^2y + 12xy^2 + 48xy - 64y^3

Conclusion

In this article, we determined that the number 30\sqrt{30} lies between 5 and 6. We also expanded and simplified three algebraic expressions. We used the distributive property and the FOIL method to expand these expressions and then simplified them to their final forms.

Discussion

The discussion category for this article is mathematics. This article is relevant to the field of mathematics because it involves algebraic expressions and the square root of a number.

Final Thoughts

Introduction

In our previous article, we determined that the number 30\sqrt{30} lies between 5 and 6. We also expanded and simplified three algebraic expressions. In this article, we will answer some frequently asked questions about algebraic expressions and square roots.

Q: What is the difference between an algebraic expression and an equation?

A: An algebraic expression is a mathematical expression that contains variables and constants, but does not contain an equal sign. An equation, on the other hand, is a mathematical statement that contains an equal sign and is used to solve for a variable.

Q: How do I expand and simplify an algebraic expression?

A: To expand and simplify an algebraic expression, you need to use the distributive property and the FOIL method. The distributive property states that you can multiply a single term by multiple terms, while the FOIL method is used to multiply two binomials.

Q: What is the FOIL method?

A: The FOIL method is a technique used to multiply two binomials. FOIL stands for First, Outer, Inner, Last, and refers to the order in which you multiply the terms.

Q: How do I find the square root of a number?

A: To find the square root of a number, you need to multiply the number by itself. For example, the square root of 16 is 4, because 4 multiplied by 4 equals 16.

Q: What is the difference between a rational number and an irrational number?

A: A rational number is a number that can be expressed as a fraction, while an irrational number is a number that cannot be expressed as a fraction.

Q: How do I determine if a number is rational or irrational?

A: To determine if a number is rational or irrational, you need to check if it can be expressed as a fraction. If it can be expressed as a fraction, it is a rational number. If it cannot be expressed as a fraction, it is an irrational number.

Q: What is the significance of the square root of a number?

A: The square root of a number is significant because it is used in a variety of mathematical applications, including algebra and calculus. It is also used in real-world applications, such as physics and engineering.

Q: How do I use the square root of a number in a mathematical expression?

A: To use the square root of a number in a mathematical expression, you need to multiply the number by itself. For example, the square root of 16 is 4, so you can write the expression as 16=4\sqrt{16} = 4.

Q: What are some common mistakes to avoid when working with algebraic expressions and square roots?

A: Some common mistakes to avoid when working with algebraic expressions and square roots include:

  • Not using the distributive property and the FOIL method to expand and simplify expressions
  • Not checking if a number is rational or irrational
  • Not using the correct notation for square roots
  • Not simplifying expressions to their final forms

Conclusion

In this article, we have answered some frequently asked questions about algebraic expressions and square roots. We have also provided some tips and tricks for working with these mathematical concepts. By following these tips and tricks, you can become more confident and proficient in your understanding of algebraic expressions and square roots.

Final Thoughts

In conclusion, algebraic expressions and square roots are fundamental concepts in mathematics that are used in a variety of applications. By understanding these concepts and how to work with them, you can become more confident and proficient in your mathematical abilities.