Applied Mathematics I Tutorial Questions PDF

Summary

This document presents a set of tutorial questions for Applied Mathematics I, specifically focusing on problem-solving and various mathematical methods outlined in a BSE 101 curriculum.

Full Transcript

## MANJARA CHARITABLE TRUST
### RAJIV GANDHI INSTITUTE OF TECHNOLOGY
### DEPARTMENT OF APPLIED SCIENCES & HUMANITIES
### APPLIED MATHEMATICS - I (BSE 101)

### TUTORIAL NO. 01

**Q.1 Solve the equations**
i) xº - x5 + x4 -1 = 0
ii)x7 + 64x4 + x3 + 64 = 0
iii) x4 - x3 + x2 - x + 1 = 0

**Q.2 Show that all the roots of (x + 1)⁶ + (x - 1)⁶ = 0 are given by - i Cot ((2k+1)π/12) where k = 0, 1, 2, 3, 4, 5**

**Q.3 Find the cube root of unity. If w is complex cube root of unity, then prove that (1 - w⁶) = -27**

**Q.4 Express Sin70 and Cos70 in terms of sine & cosθ.**

**Q.5 Express cos8θ in a series of cosines of multiples of θ.**

**Q.6 Prove that cos5θsin3θ = (1/27)(Sin80 + 2sin60 - 2sin40 - 6sin20)**

**Q.7 Prove that cos6θ - sin6θ = (1/sin2θ)(Cos60 + 15Cos20)**

**Q.8 Prove that sin6θ/sin2θ = 16cos⁴θ - 16cos²θ + 3**

**Q.9 Find the continued product of the roots of √3/2 + (i√3)/2**

**Q.10 Show that sin5θ = (sin5θ - 5sin30 + 10sine)/16**

**Q.11 If Sin6θ = acos5θsine + bcos3θ + ccosθsin5θ Find the value of a, b, c**

**Q.12 If sinθcos3θ = acosθ + bcos3θ + ccos5θ + dcos7θ thn find a, b, c, d.**

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## MANJARA CHARITABLE TRUST
### RAJIV GANDHI INSTITUTE OF TECHNOLOGY
### DEPARTMENT OF APPLIED SCIENCES & HUMANITIES
### APPLIED MATHEMATICS - I (BSE 101)

### TUTORIAL NO.-2

**Q.1 If tanhx = 2/3, find the value of x and then cosh2x**

**Q.2 Solve the equation for real values of x, 17 coshx + 18 sinhx = 1**

**Q.3 If coshβ = √(x²/y²) and cosasinhβ = 4xy/(x²+y²), show that**
i) cosec (α - iβ) + cosec (α + iβ) = (4x)/(x²+y²)
ii) cosec (α - iβ) - cosec (α + iβ) = (4iy)/(x²+y²)

**Q.4 If coshx = secθ, prove that**
i) x = log (secθ + tanθ)
ii) tanh(x/2) = tan(θ/2)

**Q.5 If u + iv = (π/7 + i√(x² -1), prove that (u² + v²)² = 2(u² - v²)**

**Q.6 Prove that cosh⁻¹(√1 + x²) = tanh⁻¹(x²)**

**Q.7 Separate into real and imaginary parts tan⁻¹(x + iy)**

**Q.8 Separate into real and imaginary parts of tan⁻¹(eiθ)**

**Q.9 Prove that coth⁻¹x = (1/2)log((x+1)/(x-1))**

**Q.10 Prove that sin[ilog(a+b)/(a²+b²)] = a + iβ, find a and β**

**Q.11 If (a+ib)x+iy = a + iβ, find a and β **

**Q.12 Show that for real value of a and b
e^(2aicot⁻¹(b)/(bi⁻¹ - 1)⁻¹a)[(bi+1)/(bi-1)] = 1**

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## MANJARA CHARITABLE TRUST
### RAJIV GANDHI INSTITUTE OF TECHNOLOGY
### DEPARTMENT OF APPLIED SCIENCES & HUMANITIES
### APPLIED MATHEMATICS - I (BSE 101)

### TUTORIAL NO. 6

1. Find the roots of the equation x³ + 2x - 5 = 0 by Regula falsi method (Take 3 iterations)
2. Find the roots of the equation 2x + 3sin(x) - 5 = 0 by Regula falsi method
3. Find the real positive root of the equations log₁₀ X - 1.2 = 0 lying between 2 and 3 correct upto four decimal places by Regula falsi method
4. Using Regula falsi method to find the root of equation 3x - cosx - 1 = 0 lying Between 0 and 1.
5. Find the real root of the equation correct to three decimal places by Newton-Raphson method.
1) eˣ - 4x = 0
2) x³ + x - 1 = 0
3) cos(x) - xex = 0
4) e⁻ˣ - sin(x) = 0
6. Solve the following equations by Jacobi's iteration method.
1) 4x + y + 3z = 17, x + 5y + z = 14, 2x -y + 8z = 12
2) 20x + y - 2z = 17, 3x + 20y - z = -18, 2x - 3y + 20z = 25
3) 5x - y + z = 10, 2x + 4y = 12, x + 5y + 5z = -1
7. Solve the following equations by Gauss-Seidel method.
1) 27x + 6 y - z = 85, 6x + 15y + 2z = 72, x + y + 54z = 110. up to 3 iterations.
2) 10x + y + z = 12 2x + 10y + z = 13, 2x + 2 y + 10z = 14 up to 3 - iterations.
3) 3x₁ - 0.1x₂ - 0.2x₃ = 7.85, 0.1x₁ + 7x₂ - 0.3x₃ = -19.3, 0.3x₁ - 0.2x₂ + 10x₃ = 71.4 up to 3 - iterations