Intergrate: x[(x^(2))-1]^(0.5) dx by subsituting x=(1/cosθ)?

6 ANSWERS

1. 
   

   x = 1/cos(T)
   
   dx = [-1/cos^2(T)](-sin(T)]dT = [sin(T)/cos^2(T)]dT
   
   x^2 - 1 = [1/cos(T)]^2 - 1 = {[1 - cos^2(T)]/cos^2(T)} = sin^2(T)/cos^2(T)
   
   [x^2 - 1]^(0.5) = sin(T)/cos(T)
   
   Putting all this together gives:
   
   [1/cos(T)][sin(T)/cos(T)][sin(T)/cos^2...
   
   [sin^2(T)/cos^4(T)]dT
   
   Now use;
   
   sin(T)/cos(T) = tan(T) and 1/cos(T) = sec(T)
   
   tan^2(T)sec^2(T)dT
   
   and the fact that d[tan(T)] = sec^2(T)dT
   
   gives the form (w^2)dw
   
   which can be easily integrated to give:
   
   (1/3)tan^3(T) + C
   
   But we want this is terms of x so use:
   
   x = 1/cos(T)
   
   cos(T) = 1/x
   
   T is an angle in a triangle where the adjacent side is 1 and the hypoteneuse is x. So the opposite side is SQRT(x^2 - 1)
   
   tan(T) = SQRT(x^2 - 1)
   
   (1/3)[x^2 - 1]^(3/2) + C

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2. 
   

   x[(x^(2))-1]^(0.5) = 1/cosθ *[(1/cosθ)^2 - 1]^(0.5)
   
                          = secθ * [ secθ^2 - 1] ^ 0.5
   
                          = secθ * [ Tanθ^2 ] ^ 0.5
   
                          = secθ * tanθ
   
                         
   
   dx = d ( 1/ cosθ) = d (secθ) = secθ *tanθ dθ
   
   So Integral { secθ * tanθ * secθ *tanθ dθ}
   
                  = integral {secθ^2 *tanθ^2 dθ}
   
                  = integral {secθ^2 *(secθ^2 - 1) dθ}
   
                  = integral {(secθ^4 - secθ^2) dθ}
   
               

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3. 
   

   i have no idea ... im guessing the answer is .... 1000

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4. 
   

   It will be (secTtanT)(sectTtanT)dT= sec^2Tta^2Tdt={(tanT)^3}/3 +c =(1/3) (sec^2T - 1)^(3/2) +c as required

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5. 
   

   ∫ x √(x² - 1) dx =
   
   according to your suggestion, let x = (1/cosθ), that is:
   
   x = secθ →
   
   dx = secθ tanθ dθ
   
   thus, substituting, you get:
   
   ∫ x √(x² - 1) dx = ∫ secθ √(sec²θ - 1) secθ tanθ dθ =
   
   recall the trig identity sec²θ = 1 + tan²θ → sec²θ - 1 = tan²θ, thus:
   
   ∫ secθ (√tan²θ) secθ tanθ dθ =
   
   ∫ secθ tanθ secθ tanθ dθ =
   
   ∫ tan²θ sec²θ dθ =
   
   note that this integrand inclused both the function tanθ (even if powered)
   
   and its derivative, that is sec²θ, that is:
   
   ∫ tan²θ d(tanθ) =
   
   thus, having both the function tanθ and its differential, you can
   
   integrate it straight into:
   
   [1/(2+1)] tan^(2+1)θ + C =
   
   (1/3) tan³θ + C
   
   now, in order to substitute back, recall:
   
   x = secθ →
   
   tanθ = √(sec²θ - 1) = √(x² - 1)
   
   yielding:
   
   (1/3) tan³θ + C = (1/3)√(x² - 1)³ + C
   
   thus, in conclusion,
   
   ∫ x √(x² - 1) dx = (1/3)√(x² - 1)³ + C = (1/3) (x² - 1)^(3/2) + C
   
   I hope this helps....
   
   Bye!
   
   

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6. 
   

   its easy. = 2

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