Differential Equations problem

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SUMMARY

The discussion focuses on solving the differential equation y' + (tan x)y = cos^2 x, with a specific solution form y = sin x cos x - cos x. Participants emphasize the importance of applying the product rule for differentiation, specifically (fg)' = fg' + gf', to correctly differentiate the given function. The main challenge highlighted is differentiating the product of sin x and cos x, which is essential for verifying the equality of the left-hand side and right-hand side of the equation.

PREREQUISITES
  • Understanding of differential equations and their standard forms
  • Familiarity with trigonometric identities, particularly sin x and cos x
  • Knowledge of differentiation techniques, especially the product rule
  • Basic grasp of tangent functions and their properties
NEXT STEPS
  • Study the application of the product rule in differentiation
  • Explore methods for solving first-order linear differential equations
  • Learn about trigonometric identities and their applications in calculus
  • Investigate the relationship between tangent functions and their derivatives
USEFUL FOR

Students studying calculus, particularly those focusing on differential equations, as well as educators looking for examples of product differentiation in trigonometric contexts.

afcwestwarrior
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Homework Statement


y=sinx cosx -cosx y'+(tanx)y=cos^2 x



I know that I'm supposed to see if the Left hand side equals the Right hand side, but I'm having problems differentiating y=sinx cosx -cosx

Yea believe it or not
 
Last edited:
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y=\sin x\cos x-\cos x is a product

Product rule: (fg)'=fg'+gf'
 
Thanks
 

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