Do you want BuboFlash to help you learning these things? Or do you want to add or correct something? Click here to log in or create user.

Question

The **difference of two squares** [...] is a squared number subtracted from another squared number to get factorized in the form of

\[a^2-b^2=(a+b)(a-b).\]

Answer

identity

Question

The **difference of two squares** [...] is a squared number subtracted from another squared number to get factorized in the form of

\[a^2-b^2=(a+b)(a-b).\]

Answer

?

Question

The **difference of two squares** [...] is a squared number subtracted from another squared number to get factorized in the form of

\[a^2-b^2=(a+b)(a-b).\]

Answer

identity

If you want to change selection, open original toplevel document below and click on "Move attachment"

#### Parent (intermediate) annotation

**Open it**

The difference of two squares identity is a squared number subtracted from another squared number to get factorized in the form of a2−b2=(a+b)(a−b).

#### Original toplevel document

**Difference Of Squares | Brilliant Math & Science Wiki**

Bhardwaj , 敬全 钟 , Sam Reeve , and 10 others Ashley Toh Lucerne O' Brannan Satyabrata Dash Ben Sidebotham Sandeep Bhardwaj Derek Guo Jongheun Lee Mahindra Jain Jimin Khim Tara Kappel contributed <span>The difference of two squares identity is a squared number subtracted from another squared number to get factorized in the form of \[a^2-b^2=(a+b)(a-b).\] We will also prove this identity by multiplying polynomials on the left side and getting equal to the right side. This identity is often used in algebra where it is useful in applicatio

The difference of two squares identity is a squared number subtracted from another squared number to get factorized in the form of a2−b2=(a+b)(a−b).

Bhardwaj , 敬全 钟 , Sam Reeve , and 10 others Ashley Toh Lucerne O' Brannan Satyabrata Dash Ben Sidebotham Sandeep Bhardwaj Derek Guo Jongheun Lee Mahindra Jain Jimin Khim Tara Kappel contributed <span>The difference of two squares identity is a squared number subtracted from another squared number to get factorized in the form of \[a^2-b^2=(a+b)(a-b).\] We will also prove this identity by multiplying polynomials on the left side and getting equal to the right side. This identity is often used in algebra where it is useful in applicatio

status | not learned | measured difficulty | 37% [default] | last interval [days] | |||
---|---|---|---|---|---|---|---|

repetition number in this series | 0 | memorised on | scheduled repetition | ||||

scheduled repetition interval | last repetition or drill |

Do you want to join discussion? Click here to log in or create user.