QUESTION IMAGE
Question
determine the degree of each monomial.
4 degree:
(2x) degree:
(4r^2s^3) degree:
(3xy^2) degree:
🆕 New Concept Discovered: Degree of a Monomial
Summing exponents of all variables in a term
Step 1: Understand the degree of a monomial
The degree of a monomial is the sum of the exponents of all its variables.
- A non-zero constant (like a plain number) has no variables, which means its variables have an exponent of \(0\). Its degree is \(0\).
- If a variable has no written exponent (like \(x\)), its exponent is understood to be \(1\).
- If there are multiple variables multiplied together, we add their exponents.
Step 2: Find the degree of \(4\)
The number \(4\) is a constant term with no variables. We can think of it as \(4x^0\).
- Exponent: \(0\)
- Degree: \(0\)
Step 3: Find the degree of \(2x\)
The term \(2x\) has a single variable, \(x\), with no written exponent. This is equivalent to \(2x^1\).
- Exponent: \(1\)
- Degree: \(1\)
Step 4: Find the degree of \(4r^2s^3\)
The term \(4r^2s^3\) has two variables: \(r\) and \(s\). We add their exponents together:
- Exponent of \(r\): \(2\)
- Exponent of \(s\): \(3\)
- Sum: \(2 + 3 = 5\)
- Degree: \(5\)
Step 5: Find the degree of \(3xy^2\)
The term \(3xy^2\) has two variables: \(x\) and \(y\). Remember that \(x\) is equivalent to \(x^1\). We add their exponents together:
- Exponent of \(x\): \(1\)
- Exponent of \(y\): \(2\)
- Sum: \(1 + 2 = 3\)
- Degree: \(3\)
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- 4 $
ightarrow$ Degree: 0
- 2x $
ightarrow$ Degree: 1
- 4r²s³ $
ightarrow$ Degree: 5
- 3xy² $
ightarrow$ Degree: 3