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grayzebra634Lv1
6 Nov 2019
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Name the zero vector for each of these vector spaces. The space P3 = {ax3 + bx2 + cx + d | a, b, c, d E R) of degree 3 or lower polynomials under the usual function addition and scalar multiplication. The space of 2x4 matrices. The space of functions {f: [0, 1] rightarrow R | f is continuous} The space of real-valued functions of one natural number input variable {f: N rightarrow R } Show transcribed image text Name the zero vector for each of these vector spaces. The space P3 = {ax3 + bx2 + cx + d | a, b, c, d E R) of degree 3 or lower polynomials under the usual function addition and scalar multiplication. The space of 2x4 matrices. The space of functions {f: [0, 1] rightarrow R | f is continuous} The space of real-valued functions of one natural number input variable {f: N rightarrow R }
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Name the zero vector for each of these vector spaces. The space P3 = {ax3 + bx2 + cx + d | a, b, c, d E R) of degree 3 or lower polynomials under the usual function addition and scalar multiplication. The space of 2x4 matrices. The space of functions {f: [0, 1] rightarrow R | f is continuous} The space of real-valued functions of one natural number input variable {f: N rightarrow R }
Show transcribed image text Name the zero vector for each of these vector spaces. The space P3 = {ax3 + bx2 + cx + d | a, b, c, d E R) of degree 3 or lower polynomials under the usual function addition and scalar multiplication. The space of 2x4 matrices. The space of functions {f: [0, 1] rightarrow R | f is continuous} The space of real-valued functions of one natural number input variable {f: N rightarrow R }0
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