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Review Euler's equation from MacLaurin series

abstract:
reference: https://fermatslasttheorem.blogspot.com/2006/02/eulers-formula.html

step	inference rule	input	output	step validity (as per SymPy)
0	0000111981: declare initial expression number of inputs: 0; feeds: 0; outputs: 1 Eq.~\ref{eq:#1} is an initial equation.		8637447837 \(f(x) = \sum_{n=0}^{\infty} \frac{f^n(0)}{n!} x^n\)	no validation is available for declarations
1	0000111981: declare initial expression number of inputs: 0; feeds: 0; outputs: 1 Eq.~\ref{eq:#1} is an initial equation.		9605409442 \(f(x) = f(0)+f'(x)\ x + \frac{f''(x)\ x^2}{2!} + \frac{f'''(x)\ x^3}{3!} + ...\)	no validation is available for declarations
2	0000111550: claim expr 1 equals expr 2 number of inputs: 2; feeds: 0; outputs: 0 Thus we see that Eq.~\ref{eq:#1} is equivalent to Eq.~\ref{eq:#2}.	9605409442 \(f(x) = f(0)+f'(x)\ x + \frac{f''(x)\ x^2}{2!} + \frac{f'''(x)\ x^3}{3!} + ...\) 8637447837 \(f(x) = \sum_{n=0}^{\infty} \frac{f^n(0)}{n!} x^n\)		missing SymPy for LHS of expression 9605409442
3	0000111981: declare initial expression number of inputs: 0; feeds: 0; outputs: 1 Eq.~\ref{eq:#1} is an initial equation.		7764834870 \(f(x) = \sum_{n=0}^{\infty} \frac{f^n(a)}{n!} (x-a)^n\)	no validation is available for declarations

Symbols used in Euler's equation from MacLaurin series

8937294510: \( \infty \)
0000009139: \( a \)
0000001592: \( n \)
0000001464: \( x \)

d3js visualization of steps and expressions in Euler's equation from MacLaurin series

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timing of Neo4j queries:

0.007 seconds for pdg_app/to_review_derivation e3727818-e3bd-491b-bc94-50444915c558
0.007 seconds for compute/get_dict_of_steps_in_derivation: steps_in_this_derivation774ecfef-c102-4fd5-b2f0-dc2d277002bf
0.004 seconds for compute/input_feed_output_infrule_for_step: get_inference_rule_connected_to_step_ID774ecfef-c102-4fd5-b2f0-dc2d277002bf
0.005 seconds for compute/input_feed_output_infrule_for_step: get_expressions_from_step_id_and_expr_type HAS_INPUT774ecfef-c102-4fd5-b2f0-dc2d277002bf
0.005 seconds for compute/input_feed_output_infrule_for_step: get_expressions_from_step_id_and_expr_type, HAS_FEED774ecfef-c102-4fd5-b2f0-dc2d277002bf
0.004 seconds for compute/input_feed_output_infrule_for_step: get_expressions_from_step_id_and_expr_type, HAS_OUTPUT774ecfef-c102-4fd5-b2f0-dc2d277002bf
0.005 seconds for compute/get_dict_of_steps_in_derivation: get_sequence_index_for_step774ecfef-c102-4fd5-b2f0-dc2d277002bf
0.003 seconds for pdg_app/ e3727818-e3bd-491b-bc94-50444915c558