(3a+2b-7)-(4b-10) In Standard Form

2 min read Jun 16, 2024
(3a+2b-7)-(4b-10) In Standard Form

Simplifying Expressions: (3a + 2b - 7) - (4b - 10)

This article will walk you through the process of simplifying the expression (3a + 2b - 7) - (4b - 10) and writing it in standard form.

Understanding the Problem

The expression (3a + 2b - 7) - (4b - 10) involves subtracting one set of terms from another. To simplify it, we need to apply the distributive property and combine like terms.

Step-by-Step Solution

  1. Distribute the negative sign: Remember that subtracting an expression is the same as adding the negative of that expression. So, we rewrite the expression as: 3a + 2b - 7 + (-1)(4b - 10)

  2. Simplify: Distribute the -1: 3a + 2b - 7 - 4b + 10

  3. Combine like terms: Group the terms with the same variable together: 3a + (2b - 4b) + (-7 + 10)

  4. Simplify further: Combine the coefficients of the like terms: 3a - 2b + 3

Standard Form

The standard form of a linear expression is ax + by + c, where a, b, and c are constants, and x and y are variables.

Therefore, the simplified expression (3a + 2b - 7) - (4b - 10) in standard form is 3a - 2b + 3.

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