integration by substitution

Summary

integration by substitution is a method for evaluating integrals^[1]. It draws 321 Wikipedia views per month (method_for_evaluating_integrals category, ranking #2 of 2).^[2]

Key Facts

• integration by substitution's instance of is recorded as method for evaluating integrals^[3].
• integration by substitution's subclass of is recorded as change of variables^[4].
• integration by substitution's Freebase ID is recorded as /m/01bhr2^[5].
• integration by substitution's defining formula is recorded as \int_a^b f(\phi(x)) \phi'(x) \, \mathrm{d}x = \int_{\phi(a)}^{\phi(b)} f(t) \, \mathrm{d}t^[6].
• integration by substitution's MathWorld ID is recorded as ChangeofVariablesTheorem^[7].
• integration by substitution's JSTOR topic ID is recorded as integration-by-substitution^[8].
• integration by substitution's maintained by WikiProject is recorded as WikiProject Mathematics^[9].
• integration by substitution's Microsoft Academic ID is recorded as 127228971^[10].
• integration by substitution's Brilliant Wiki ID is recorded as u-substitution^[11].
• integration by substitution's in defining formula is recorded as f^[12].
• integration by substitution's in defining formula is recorded as \phi^[13].
• integration by substitution's in defining formula is recorded as \int_a^b f(x) \, \mathrm{d}x^[14].
• integration by substitution's in defining formula is recorded as '^[15].
• integration by substitution's Digital Library of Mathematical Functions ID is recorded as 1.4.E28^[16].

Body

Designation and Status

integration by substitution's instance of is recorded as method for evaluating integrals^[3].

Why It Matters

integration by substitution draws 321 Wikipedia views per month (method_for_evaluating_integrals category, ranking #2 of 2).^[2] It has Wikipedia articles in 22 language editions, a strong signal of global cultural recognition.^[17] It is known by 17 alternative names across languages and contexts.^[18]