Express $(x+7)^2$ As A Trinomial In Standard Form.

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Introduction

In algebra, a binomial is a polynomial with two terms, while a trinomial is a polynomial with three terms. Expressing a binomial as a trinomial involves expanding the binomial using the distributive property. In this article, we will focus on expressing the binomial $(x+7)^2$ as a trinomial in standard form.

Understanding the Concept of Expanding a Binomial

To expand a binomial, we need to apply the distributive property, which states that for any real numbers aa, bb, and cc, a(b+c)=ab+aca(b+c) = ab + ac. This property can be applied to expand a binomial by multiplying each term in the binomial by the other term.

Expanding the Binomial $(x+7)^2$

To expand the binomial $(x+7)^2$, we need to apply the distributive property. We can start by multiplying the first term xx by the second term 77, and then multiplying the second term 77 by the first term xx.

(x+7)2=(x+7)(x+7)(x+7)^2 = (x+7)(x+7)

Using the distributive property, we can expand the binomial as follows:

(x+7)(x+7)=x(x+7)+7(x+7)(x+7)(x+7) = x(x+7) + 7(x+7)

Now, we can apply the distributive property again to expand each term:

x(x+7)=x2+7xx(x+7) = x^2 + 7x

7(x+7)=7x+497(x+7) = 7x + 49

Substituting these expressions back into the original equation, we get:

(x+7)2=x2+7x+7x+49(x+7)^2 = x^2 + 7x + 7x + 49

Combining like terms, we get:

(x+7)2=x2+14x+49(x+7)^2 = x^2 + 14x + 49

Conclusion

In this article, we have shown how to express the binomial $(x+7)^2$ as a trinomial in standard form. By applying the distributive property and combining like terms, we were able to expand the binomial and express it as a trinomial. This process can be applied to any binomial to express it as a trinomial.

Example Problems

Problem 1

Express the binomial $(x-3)^2$ as a trinomial in standard form.

Solution

To express the binomial $(x-3)^2$ as a trinomial in standard form, we need to apply the distributive property. We can start by multiplying the first term xx by the second term βˆ’3-3, and then multiplying the second term βˆ’3-3 by the first term xx.

(xβˆ’3)2=(xβˆ’3)(xβˆ’3)(x-3)^2 = (x-3)(x-3)

Using the distributive property, we can expand the binomial as follows:

(xβˆ’3)(xβˆ’3)=x(xβˆ’3)+(βˆ’3)(xβˆ’3)(x-3)(x-3) = x(x-3) + (-3)(x-3)

Now, we can apply the distributive property again to expand each term:

x(xβˆ’3)=x2βˆ’3xx(x-3) = x^2 - 3x

(βˆ’3)(xβˆ’3)=βˆ’3x+9(-3)(x-3) = -3x + 9

Substituting these expressions back into the original equation, we get:

(xβˆ’3)2=x2βˆ’3xβˆ’3x+9(x-3)^2 = x^2 - 3x - 3x + 9

Combining like terms, we get:

(xβˆ’3)2=x2βˆ’6x+9(x-3)^2 = x^2 - 6x + 9

Problem 2

Express the binomial $(x+2)^2$ as a trinomial in standard form.

Solution

To express the binomial $(x+2)^2$ as a trinomial in standard form, we need to apply the distributive property. We can start by multiplying the first term xx by the second term 22, and then multiplying the second term 22 by the first term xx.

(x+2)2=(x+2)(x+2)(x+2)^2 = (x+2)(x+2)

Using the distributive property, we can expand the binomial as follows:

(x+2)(x+2)=x(x+2)+2(x+2)(x+2)(x+2) = x(x+2) + 2(x+2)

Now, we can apply the distributive property again to expand each term:

x(x+2)=x2+2xx(x+2) = x^2 + 2x

2(x+2)=2x+42(x+2) = 2x + 4

Substituting these expressions back into the original equation, we get:

(x+2)2=x2+2x+2x+4(x+2)^2 = x^2 + 2x + 2x + 4

Combining like terms, we get:

(x+2)2=x2+4x+4(x+2)^2 = x^2 + 4x + 4

Tips and Tricks

  • When expanding a binomial, make sure to apply the distributive property correctly.
  • When combining like terms, make sure to combine the coefficients of the terms.
  • When expressing a binomial as a trinomial, make sure to use the correct notation.

Conclusion

Frequently Asked Questions

Q: What is a binomial?

A: A binomial is a polynomial with two terms. It is an expression that consists of two terms separated by a plus or minus sign.

Q: What is a trinomial?

A: A trinomial is a polynomial with three terms. It is an expression that consists of three terms separated by plus or minus signs.

Q: How do I express a binomial as a trinomial?

A: To express a binomial as a trinomial, you need to apply the distributive property. This involves multiplying each term in the binomial by the other term.

Q: What is the distributive property?

A: The distributive property is a mathematical property that states that for any real numbers aa, bb, and cc, a(b+c)=ab+aca(b+c) = ab + ac. This property can be applied to expand a binomial by multiplying each term in the binomial by the other term.

Q: How do I apply the distributive property to expand a binomial?

A: To apply the distributive property, you need to multiply each term in the binomial by the other term. For example, if you have the binomial $(x+7)^2$, you would multiply the first term xx by the second term 77, and then multiply the second term 77 by the first term xx.

Q: What is the difference between expanding a binomial and expressing it as a trinomial?

A: Expanding a binomial involves applying the distributive property to multiply each term in the binomial by the other term. Expressing a binomial as a trinomial involves combining like terms after expanding the binomial.

Q: How do I combine like terms?

A: To combine like terms, you need to add or subtract the coefficients of the terms. For example, if you have the expression $x^2 + 7x + 7x + 49$, you would combine the like terms $7x$ and $7x$ to get $14x$.

Q: What is the standard form of a trinomial?

A: The standard form of a trinomial is an expression that consists of three terms separated by plus or minus signs, with the terms in descending order of degree.

Q: How do I express a binomial as a trinomial in standard form?

A: To express a binomial as a trinomial in standard form, you need to apply the distributive property, combine like terms, and arrange the terms in descending order of degree.

Q: What are some common mistakes to avoid when expressing a binomial as a trinomial?

A: Some common mistakes to avoid when expressing a binomial as a trinomial include:

  • Failing to apply the distributive property correctly
  • Failing to combine like terms
  • Failing to arrange the terms in descending order of degree
  • Making errors when multiplying or adding terms

Q: How can I practice expressing binomials as trinomials?

A: You can practice expressing binomials as trinomials by working through examples and exercises. You can also try creating your own binomials and expressing them as trinomials.

Additional Resources

Conclusion

In this article, we have answered some frequently asked questions about expressing binomials as trinomials. We have covered topics such as the distributive property, combining like terms, and the standard form of a trinomial. We hope that this article has been helpful in answering your questions and providing you with a better understanding of how to express binomials as trinomials.