Question
Identify the multiplicities of the linear factors of h(x)=(x+4)(x-1)^2(x+3)^5
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GPT-4o mini
To identify the multiplicities of the linear factors of the polynomial \( h(x) = (x+4)(x-1)^2(x+3)^5 \), we can analyze each factor in the expression:
1. The factor \( (x + 4) \) has a multiplicity of **1** because it appears only once.
2. The factor \( (x - 1)^2 \) has a multiplicity of **2** because it appears with an exponent of 2.
3. The factor \( (x + 3)^5 \) has a multiplicity of **5** because it appears with an exponent of 5.
In summary, the multiplicities of the linear factors are:
- \( x + 4 \): multiplicity 1
- \( x - 1 \): multiplicity 2
- \( x + 3 \): multiplicity 5
1. The factor \( (x + 4) \) has a multiplicity of **1** because it appears only once.
2. The factor \( (x - 1)^2 \) has a multiplicity of **2** because it appears with an exponent of 2.
3. The factor \( (x + 3)^5 \) has a multiplicity of **5** because it appears with an exponent of 5.
In summary, the multiplicities of the linear factors are:
- \( x + 4 \): multiplicity 1
- \( x - 1 \): multiplicity 2
- \( x + 3 \): multiplicity 5
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