To simplify the expression 5x 3x, we first need to understand the concept of simplifying expressions. Simplifying an expression means combining like terms or performing any necessary operations to make the expression as simple as possible.
In this case, we have two terms - 5x and 3x. Both terms have the same variable, which is x, and the same exponents, which is 1. Therefore, we can combine these terms by adding their coefficients.
When we add 5x and 3x, we get a total of 8x. So, the simplified form of 5x 3x is 8x.
It's important to note that when simplifying expressions, we can only combine terms that have the same variable and exponents. In this case, since both terms have the variable x raised to the power of 1, we were able to combine them.
Remember that simplifying expressions allows us to work with them more easily and understand the underlying relationships between different terms. It also helps us solve equations and perform other mathematical operations more efficiently.
So, in conclusion, to simplify 5x 3x, we can simply add the coefficients and write the resulting term as 8x.
What is 5x plus 3x? This is a common question in algebra that requires combining like terms. In this case, we have two terms, 5x and 3x, both containing the variable x. To find the sum, we simply add the coefficients of the x terms. So, 5x plus 3x equals 8x.
Combining like terms is an essential skill in algebra. It allows us to simplify expressions and solve equations. By adding or subtracting coefficients, we can simplify the expression and make it easier to work with.
In this example, we have two terms with the same variable, x. The coefficient of the first term is 5, and the coefficient of the second term is 3. To find the sum, we add the coefficients together, which gives us 8. Since both terms have the same variable, x, the sum is multiplied by x, resulting in 8x.
It's important to note that the x term represents a variable and can have various values. When simplifying expressions, we can substitute different values for x and evaluate the expression. The simplified form, 8x, represents a general expression that can be used for any value of x.
To solve the equation 5x^3, we need to evaluate the expression for a given value of x.
To calculate 5x^3, we first need to raise the value of x to the power of 3. This means multiplying the value of x by itself three times.
For example, if x is equal to 2, we have 5(2^3).
2^3 can be computed as 2 × 2 × 2, which equals 8. Therefore, we have 5 × 8.
The solution to the equation 5x^3 when x is equal to 2 is 40.
This process can be applied to any value of x.
So, to solve the equation 5x^3, substitute the value of x into the equation and raise it to the power of 3. Finally, multiply the result by 5.
5x 2 can be simplified by multiplying the numbers together. In this case, we have 5 multiplied by x squared.
To simplify, we multiply the numbers: 5 multiplied by 2 equals 10. So, the simplified expression is 10x^2.
When solving algebraic expressions, it is important to simplify them to their simplest form. In this case, we have multiplied the numbers and combined like terms to obtain the simplified expression 10x^2.
By simplifying the expression, we can easily work with it and perform further calculations or solve equations.
In summary, to simplify 5x^2, we multiply the numbers together, which gives us 10x^2. This is the simplified form of the expression, making it easier to work with in algebraic calculations.