Math  /  Algebra

QuestionSuppose a 7×117 \times 11 matrix AA has seven pivot columns. Is ColA=R7?\operatorname{Col} A=\mathbb{R}^{7} ? Is Nul=R4N u l=\mathbb{R}^{4} ? Explain your answers.
Is ColA=R7\operatorname{Col} A=\mathbb{R}^{7} ? A: No, ColA\operatorname{Col} A is not R7\mathbb{R}^{7}. Since AA has seven pivot columns, dimColA=4\operatorname{dim} \operatorname{Col} A=4. Thus, ColA\operatorname{Col} A is equal to R4\mathbb{R}^{4}. B. No. Since AA has seven pivot columns, dimColA=7\operatorname{dim} \operatorname{Col} A=7. Thus, ColA\operatorname{Col} A is a seven-dimensional subspace of R7\mathbb{R}^{7}, so ColA\mathrm{Col} A is not equal to R7\mathbb{R}^{7}. C. Yes. Since AA has seven pivot columns, dimColA=7\operatorname{dim} \operatorname{Col} A=7. Thus, ColA\operatorname{Col} A is a seven-dimensional subspace of R7\mathbb{R}^{7}, so ColA\operatorname{Col} A is equal to R7\mathbb{R}^{7}. D. No, the column space of AA is not R7\mathbb{R}^{7}. Since AA has seven pivot columns, dimColA=0\operatorname{dim} \operatorname{Col} A=0. Thus, ColA\operatorname{Col} A is equal to 0 .
Is NulA=R4\operatorname{Nul} A=\mathbb{R}^{4} ? A. No, Nul AA is not equal to R4\mathbb{R}^{4}. It is true that dimNulA=4\operatorname{dim} \operatorname{Nul} A=4, but Nul AA is a subspace of R11\mathbb{R}^{11}. B. No, Nul AA is not equal to R4\mathbb{R}^{4}. Since AA has seven pivot columns, dimNulA=7\operatorname{dim} \operatorname{Nul} A=7. Thus, Nul AA is equal to R7\mathbb{R}^{7}. C. No, Nul AA is equal to R4\mathbb{R}^{4}. Since AA has seven pivot columns, dimNulA=0\operatorname{dim} \operatorname{Nul} A=0. Thus, Nul AA is equal to 0 . D. Yes, Nul AA is equal to R4\mathbb{R}^{4}. Since AA has seven pivot columns, dimNulA=4\operatorname{dim} \operatorname{Nul} A=4. Thus, Nul AA is equal to R4\mathbb{R}^{4}.

Studdy Solution
Determine if NulA=R4\operatorname{Nul} A = \mathbb{R}^4:
The null space NulA\operatorname{Nul} A is a subspace of R11\mathbb{R}^{11} because A A has 11 columns. The dimension of the null space is given by the formula:
dimNulA=number of columnsnumber of pivot columns=117=4\operatorname{dim} \operatorname{Nul} A = \text{number of columns} - \text{number of pivot columns} = 11 - 7 = 4
Since dimNulA=4\operatorname{dim} \operatorname{Nul} A = 4, NulA\operatorname{Nul} A is a four-dimensional subspace of R11\mathbb{R}^{11}, not R4\mathbb{R}^4.
The correct answer is: A. No, Nul A A is not equal to R4\mathbb{R}^4. It is true that dimNulA=4\operatorname{dim} \operatorname{Nul} A = 4, but Nul A A is a subspace of R11\mathbb{R}^{11}.

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