5.6 Integration by Substitution Method (U-substitution) Fri Feb 5 Do Now Find the derivative of f (x) = sin(x ) 2 g(x) = sin(x + x 3 ) HW Review: p.326 Reverse Chain Rule • Looking at the 2 Do Now problems, we can say 2 2 2x cos(x ) dx = sin(x ) ò ò (1+ 3x )cos(x + x ) dx = sin(x + x ) 2 3 3 • Notice how 2 factors integrate into one Substitution Method • If F’(x) = f(x), then ò f (u(x))u'(x) dx = F(u(x))+ C Integration by Substitution (U-Substitution) • 1) Choose an expression for u – Expressions that are “inside” another function du • 2) Compute du = dx dx • 3) Replace all x terms in the original integrand so there are only u’s • 4) Evaluate the resulting (u) integral • 5) Replace u after integration Expressions for U-substitution • • • • Under an exponent Inside a function (trig, exponential, ln) In the denominator The factor in a product with the higher exponent • Remember: you want to choose a U expression whose derivative will allow you to substitute the remainder of the integrand! Ex1 • Evaluate ò 3x 2 sin(x ) dx 3 Ex 2 – Multiplying du by constant • Evaluate ò x(x 2 + 9) dx 5 Ex 3 – u in the denominator • Evaluate ò (x + 2x) dx 3 2 6 (x + 3x +12) 2 Ex 4 - Trig • Evaluate ò sin(7q + 5) dq Ex 5 – Integrating tangent • Evaluate ò tan x dx Ex 6 – 2 step Substitution • Evaluate òx 5x +1 dx Substitution and Definite Integrals • When using u-substitution with definite integrals you have 2 options – Plug x back in and evaluate the bounds that way – Change the x bounds into u bounds and evaluate in terms of u Ex • Evaluate ò 2 0 x 2 x 3 +1 dx Closure • Evaluate the integral òx 2 cos(x +1) dx 3 • HW: p.333-335 #1-89 EOO due Monday, 1-89 AOO due Tuesday 5.6 U-Substitution Review / Practice • Do Now • Evaluate the integrals 8 • 1) ò sin x cos x dx • 2) ò 2x 2 + x dx 3 2 2 (4x + 3x ) HW Review: p.333 1-89 Practice • Worksheet if time Closure • Evaluate the integral • HW: p.333 #1-89 AOO ò (x +1)e x 2 +2 x dx 5.6 Substitution Method Tues Feb 9 • Evaluate the integral using substitution dx ò x ln x HW Review: p.333 1-89 Practice • Worksheet Closure • When do we use substitution when integrating? How does it work? What about with definite integrals? • HW: none