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- Question 1, Exercise 1.1
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- Question 7, Exercise 1.1
- Question 1, Exercise 1.2
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- Question 6(i-ix), Exercise 1.4
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- Question 1, Review Exercise
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- Question 1, Exercise 2.1
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- Question 1, Review Exercise
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- Question 1 and 2, Exercise 4.4
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- Question 12 and 13, Exercise 4.4
- Question 14 and 15, Exercise 4.4
- Question 16 and 17, Exercise 4.4
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- Question 24 and 25, Exercise 4.4
- Question 26 and 27, Exercise 4.4
- Question 28 and 29, Exercise 4.4
- Question 30, Exercise 4.4
- Question 1 and 2, Exercise 4.5
- Question 3 and 4, Exercise 4.5
- Question 5 and 6, Exercise 4.5
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- Question 11, 12 and 13, Exercise 4.5
- Question 14, Exercise 4.5
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- Question 16, Exercise 4.5
- Question 1 and 2, Exercise 4.6
- Question 3 & 4, Exercise 4.6
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- Question 7 & 8, Exercise 4.6
- Question 9 & 10, Exercise 4.6
- Question 11, Exercise 4.6
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- Question 1 and 2, Exercise 4.7
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- Question 11, 12 and 13, Exercise 4.7
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- Question 25 and 26, Exercise 4.7
- Question 27 and 28, Exercise 4.7
- Question 29 and 30, Exercise 4.7
- Question 1 and 2, Exercise 4.8
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- Question 11 and 12, Exercise 4.8
- Question 13, 14 and 15, Exercise 4.8
- Question 1, Exercise 5.1
- Question 2 and 3, Exercise 5.1
- Question 4 and 5, Exercise 5.1
- Question 6 and 7, Exercise 5.1
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- Question 10, Exercise 5.1
- Question 1 and 2, Exercise 5.2
- Question 3 and 4, Exercise 5.2
- Question 5 and 6, Exercise 5.2
- Question 7 and 8, Exercise 5.2
- Question 1, Exercise 5.3
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- Question 2, Review Exercise
- Question 1, Review Exercise
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- Question 1, 2 and 3 Exercise 8.2
- Question 4 Exercise 8.2
- Question 5 Exercise 8.2
- Question 6 Exercise 8.2
- Question 7 Exercise 8.2
- Question 8(i, ii & iii) Exercise 8.2
- Question 8(iv, v & vi) Exercise 8.2
- Question 8(vii, viii & ix) Exercise 8.2
- Question 8(x, xi & xii) Exercise 8.2
- Question 8(xiii, xiv & xv) Exercise 8.2
- Question 8(xvi, xvii & xviii) Exercise 8.2
- Question 8(xix, xx, xxi & xxii) Exercise 8.2
- Question 1(i, ii, iii & iv) Exercise 8.3
- Question 1(v, vi, vii & viii) Exercise 8.3
- Question 1(ix, x & xi) Exercise 8.3
- Question 2(i, ii, iii, iv and v) Exercise 8.3
- Question 3(i, ii, iii, iv & v) Exercise 8.3
- Question 3(vi, vii, viii, ix & x) Exercise 8.3
- Question 3(xi, xii & xiii) Exercise 8.3
- Question 4 Exercise 8.3
- Question 1, Review Exercise
- Question 2, Review Exercise
- Question 3, Review Exercise
- Question 4, Review Exercise
- Question 5 and 6, Review Exercise
- Question 7, Review Exercise
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- Question 9, Review Exercise
- Question 10, Review Exercise
- Question 1, Exercise 9.1
- Question 2, Exercise 9.1
- Question 3, Exercise 9.1
- Question 4(i-iv), Exercise 9.1
- Question 4(v-viii), Exercise 9.1
- Question 5(i-v), Exercise 9.1
- Question 5(vi-x), Exercise 9.1
- Question 6, Exercise 9.1
- Question 7 & 8, Exercise 9.1
- Question 9, Exercise 9.1
- Question 10, Exercise 9.1
- Question 2 and 3,Review Exercise
- Question 4, Review Exercise
- Question 1,Review Exercise
- Question 2 and 3, Review Exercise
- Question 4, Review Exercise
- Question 5 and 6, Review Exercise
- Question 7, Review Exercise
- Question 8, Review Exercise
- Question 9, Review Exercise
- Question 10(i-v), Review Exercise
- Question 10(vi-x), Review Exercise
- Question 10(xi-xv), Review Exercise
Fulltext results:
- Unit 04: Sequences and Seeries @math-11-nbf:sol
- olutions)"> * [[math-11-nbf:sol:unit04:ex4-1-p1|Question 1 & 2]] * [[math-11-nbf:sol:unit04:ex4-1-p2|Question 3 & 4]] * [[math-11-nbf:sol:unit04:ex4-1-p3|Question 5 & 6]] * [[math-11-nbf:sol:unit04:ex4-1-p4|Question 7 & 8]] * [[math-11-nbf:sol:unit04:ex4-1-p5|Questi
- Unit 08: Fundamental of Trigonometry @math-11-nbf:sol
- olutions)"> * [[math-11-nbf:sol:unit08:ex8-1-p1|Question 1]] * [[math-11-nbf:sol:unit08:ex8-1-p2|Question 2 ]] * [[math-11-nbf:sol:unit08:ex8-1-p3|Question 3]] * [[math-11-nbf:sol:unit08:ex8-1-p4|Question 4]] * [[math-11-nbf:sol:unit08:ex8-1-p5|Question 5 & 6
- Unit 01: Complex Numbers (Solutions) @math-11-nbf:sol
- olutions)"> * [[math-11-nbf:sol:unit01:ex1-1-p1|Question 1]] * [[math-11-nbf:sol:unit01:ex1-1-p2|Question 2]] * [[math-11-nbf:sol:unit01:ex1-1-p3|Question 3]] * [[math-11-nbf:sol:unit01:ex1-1-p4|Question 4]] * [[math-11-nbf:sol:unit01:ex1-1-p5|Question 5]]
- Unit 02: Matrices and Determinants (Solutions) @math-11-nbf:sol
- olutions)"> * [[math-11-nbf:sol:unit02:ex2-1-p1|Question 1]] * [[math-11-nbf:sol:unit02:ex2-1-p2|Question 2]] * [[math-11-nbf:sol:unit02:ex2-1-p3|Question 3]] * [[math-11-nbf:sol:unit02:ex2-1-p4|Question 4]] </panel> <panel type="default" title="Exercise 2.2 (
- Unit 05: Polynomials @math-11-nbf:sol
- olutions)"> * [[math-11-nbf:sol:unit05:ex5-1-p1|Question 1]] * [[math-11-nbf:sol:unit05:ex5-1-p2|Question 2 & 3]] * [[math-11-nbf:sol:unit05:ex5-1-p3|Question 4 & 5]] * [[math-11-nbf:sol:unit05:ex5-1-p4|Question 6 & 7]] * [[math-11-nbf:sol:unit05:ex5-1-p5|Questi
- Unit 09: Trigonometric Functions @math-11-nbf:sol
- olutions)"> * [[math-11-nbf:sol:unit09:ex9-1-p1|Question 1]] * [[math-11-nbf:sol:unit09:ex9-1-p2|Question 2 ]] * [[math-11-nbf:sol:unit09:ex9-1-p3|Question 3]] * [[math-11-nbf:sol:unit09:ex9-1-p4|Question 4(i-iv)]] * [[math-11-nbf:sol:unit09:ex9-1-p5|Question
- Question 1, Exercise 1.3 @math-11-nbf:sol:unit01
- ====== Question 1, Exercise 1.3 ====== Solutions of Question 1 of Exercise 1.3 of Unit 01: Complex Numbers. This is unit of... ederal Textbook Board, Islamabad, Pakistan. ====Question 1(i)==== Factorize the polynomial into linear fun... (13i)^2 \\ = &(z + 13i)(z - 13i). \end{align} ====Question 1(ii)==== Factorize the polynomial into linear fu
- Question 6(i-ix), Exercise 1.4 @math-11-nbf:sol:unit01
- ====== Question 6(i-ix), Exercise 1.4 ====== Solutions of Question 6(i-ix) of Exercise 1.4 of Unit 01: Complex Numbers. Thi... deral Textbook Board, Islamabad, Pakistan. =====Question 6(i)===== Write a given complex number in the al... {i}{\sqrt{2}} \right) \\ =& 1-i. \end{align} =====Question 6(ii)===== Write a given complex number in the al
- Question 2, Exercise 1.1 @math-11-nbf:sol:unit01
- ====== Question 2, Exercise 1.1 ====== Solutions of Question 2 of Exercise 1.1 of Unit 01: Complex Numbers. This is unit of... ederal Textbook Board, Islamabad, Pakistan. ====Question 2(i)==== Write the following complex number in th... )\\ =&(3+2)+(i2+i4)\\ =&5+i6\end{align} GOOD ====Question 2(ii)==== Write the following complex number in t
- Question 6(x-xvii), Exercise 1.4 @math-11-nbf:sol:unit01
- ====== Question 6(x-xvii), Exercise 1.4 ====== Solutions of Question 6(x-xvii) of Exercise 1.4 of Unit 01: Complex Numbers.... deral Textbook Board, Islamabad, Pakistan. =====Question 6(x)===== Write a given complex number in the alg... tion. ** //Do yourself as previous parts.// =====Question 6(xi)===== Write a given complex number in the al
- Question 10, Exercise 8.1 @math-11-nbf:sol:unit08
- ====== Question 10, Exercise 8.1 ====== Solutions of Question 10 of Exercise 8.1 of Unit 08: Fundamental of Trigonometry. T... ral Textbook Board, Islamabad, Pakistan. ===== Question 10(i)===== Verify: $\sin \left(\dfrac{\pi}{2}-\a... \ & = \cos\alpha = R.H.S \end{align*} GOOD ===== Question 10(ii)===== Verify: $\cos (\pi-\alpha)=-\cos \al
- Question 11, Exercise 8.1 @math-11-nbf:sol:unit08
- ====== Question 11, Exercise 8.1 ====== Solutions of Question 11 of Exercise 8.1 of Unit 08: Fundamental of Trigonometry. T... ral Textbook Board, Islamabad, Pakistan. ===== Question 11(i)===== Show that: $\dfrac{\sin \left(180^{\ci... mbda)} \\ & = 1 = R.H.S \end{align*} GOOD ===== Question 11(ii)===== Show that: $\dfrac{\sin \left(90^{\ci
- Question 8, Exercise 1.2 @math-11-nbf:sol:unit01
- ====== Question 8, Exercise 1.2 ====== Solutions of Question 8 of Exercise 1.2 of Unit 01: Complex Numbers. This is unit of... Federal Textbook Board, Islamabad, Pakistan. ====Question 8(i)==== Write $|2 z-i|=4$ in terms of $x$ and $y... 2+4y^2-4y-15=0, \end{align} as required. GOOD ====Question 8(ii)==== Write $|z-1|=|\bar{z}+i|$ in terms of $
- Question 9, Exercise 1.2 @math-11-nbf:sol:unit01
- ====== Question 9, Exercise 1.2 ====== Solutions of Question 9 of Exercise 1.2 of Unit 01: Complex Numbers. This is unit of... Federal Textbook Board, Islamabad, Pakistan. ====Question 9(i)==== Find real and imaginary parts of $(2+4 i... c{4}{20}\\ &= \dfrac{1}{5}. \end{align} GOOD ====Question 9(ii)==== Find real and imaginary parts of $(3-\
- Question 7, Exercise 1.4 @math-11-nbf:sol:unit01
- ====== Question 7, Exercise 1.4 ====== Solutions of Question 7 of Exercise 1.4 of Unit 01: Complex Numbers. This is unit of... deral Textbook Board, Islamabad, Pakistan. =====Question 7(i)===== Convert the following equation in Carte... mplies & x+y = 1. \end{align*} As required. =====Question 7(ii)===== Convert the following equations and in