Theorem 3. The covariant derivative of the product (outer or inner) of two tensors is equal to the sum of the two terms obtained by the product (outer or inner) of each tensor with covariant deri- vative of the other tensor.

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Theorem 3. The covariant derivative of the product (outer
or inner) of two tensors is equal to the sum of the two terms obtained
by the product (outer or inner) of each tensor with covariant deri-
vative of the other tensor.
Transcribed Image Text:Theorem 3. The covariant derivative of the product (outer or inner) of two tensors is equal to the sum of the two terms obtained by the product (outer or inner) of each tensor with covariant deri- vative of the other tensor.
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