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- Definitions: FSc Part1 KPK
- Important Questions
- Multiple Choice Questions (MCQs)
- Unit 1: Complex Numbers (Solutions)
- Unit 10: Trigonometric Identities of Sum and Difference of Angles (Solutions)
- Question 1, Exercise 1.1
- Question 2 & 3, Exercise 1.1
- Question 4, Exercise 1.1
- Question 5, Exercise 1.1
- Question 6, Exercise 1.1
- Question 7, Exercise 1.1
- Question 8, Exercise 1.1
- Question 9 & 10, Exercise 1.1
- Question 11, Exercise 1.1
- Question 1, Exercise 1.2
- Question 2, Exercise 1.2
- Question 3 & 4, Exercise 1.2
- Question 5, Exercise 1.2
- Question 6, Exercise 1.2
- Question 7, Exercise 1.2
- Question 8, Exercise 1.2
- Question 9, Exercise 1.2
- Question 1, Exercise 1.3
- Question 2, Exercise 1.3
- Question 3 & 4, Exercise 1.3
- Question 5, Exercise 1.3
- Question 6, Exercise 1.3
- Question 1, Review Exercise 1
- Question 2 & 3, Review Exercise 1
- Question 4 & 5, Review Exercise 1
- Question 6, 7 & 8, Review Exercise 1
- Question 1, Exercise 10.1
- Question 2, Exercise 10.1
- Question 3, Exercise 10.1
- Question, Exercise 10.1
- Question 5, Exercise 10.1
- Question 6, Exercise 10.1
- Question 7, Exercise 10.1
- Question 8, Exercise 10.1
- Question 9 and 10, Exercise 10.1
- Question11 and 12, Exercise 10.1
- Question 13, Exercise 10.1
- Question 1, Exercise 10.2
- Question 2, Exercise 10.2
- Question 3, Exercise 10.2
- Question 4 and 5, Exercise 10.2
- Question 6, Exercise 10.2
- Question 7, Exercise 10.2
- Question 8 and 9, Exercise 10.2
- Question 1, Exercise 10.3
- Question 2, Exercise 10.3
- Question 3, Exercise 10.3
- Question 5, Exercise 10.3
- Question 5, Exercise 10.3
- Question 1, Review Exercise 10
- Question 2 and 3, Review Exercise 10
- Question 4 & 5, Review Exercise 10
- Question 6 & 7, Review Exercise 10
- Question 8 & 9, Review Exercise 10
Fulltext results:
- Unit 10: Trigonometric Identities of Sum and Difference of Angles (Solutions) @fsc-part1-kpk:sol
- default" title="Exercise 10.1 (Solutions)"> * [[fsc-part1-kpk:sol:unit10:ex10-1-p1|Question 1]] * [[fsc-part1-kpk:sol:unit10:ex10-1-p2|Question 2]] * [[fsc-part1-kpk:sol:unit10:ex10-1-p3|Question 3]] * [[fsc-part1-kpk:sol:unit10:ex10-1-p4|Question 4]] *
- Unit 1: Complex Numbers (Solutions) @fsc-part1-kpk:sol
- "default" title="Exercise 1.1 (Solutions)"> * [[fsc-part1-kpk:sol:unit01:ex1-1-p1|Question 1]] * [[fsc-part1-kpk:sol:unit01:ex1-1-p2|Question 2-3]] * [[fsc-part1-kpk:sol:unit01:ex1-1-p3|Question 4]] * [[fsc-part1-kpk:sol:unit01:ex1-1-p4|Question 5]] * [[
- Question 3, Exercise 10.2 @fsc-part1-kpk:sol:unit10
- by drawing the reference triangle as shown: {{ :fsc-part1-kpk:sol:unit10:fsc-part1-kpk-ex10-2-q3.png?nolink |Reference triangle}} We find: $\cos \theta =... by drawing the reference triangle as shown: {{ :fsc-part1-kpk:sol:unit10:fsc-part1-kpk-ex10-2-q3.png?nolink |Reference triangle}} We find: $\cos \theta =
- Question 1, Exercise 10.2 @fsc-part1-kpk:sol:unit10
- By drawing the reference triangle as shown: {{ :fsc-part1-kpk:sol:unit10:fsc-part1-kpk-ex10-2-q1.png?nolink |reference triangle}} we find $\sin \theta =... 12}}$$ <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit10:ex10-2-p2|Question 2 >]]</bt
- Question 2 & 3, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- to ==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-1-p1|< Question 1]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p3|Question 4 >]]</btn
- Question 4, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- {align} <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-1-p2 |< Question 2 & 3]]... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p4|Question 5 >]]</btn
- Question 5, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- {align} <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-1-p3|< Question 4]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p5|Question 6 >]]</btn
- Question 6, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- {align} <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-1-p4|< Question 5]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p6|Question 7 >]]</btn
- Question 7, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- o to==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-1-p5|< Question 6]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p7|Question 8 >]]</btn
- Question 8, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- o to==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-1-p6|< Question 7]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p8|Question 9 & 10 >]
- Question 9 & 10, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- o to==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-1-p7|< Question 8]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p9|Question 11 >]]</b
- Question 2, Exercise 1.2 @fsc-part1-kpk:sol:unit01
- To ==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-2-p1|< Question 1]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-2-p3|Question 3, 4 >]]<
- Question 3 & 4, Exercise 1.2 @fsc-part1-kpk:sol:unit01
- To ==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-2-p2|< Question 2]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-2-p4|Question 5 >]]</bt
- Question 5, Exercise 1.2 @fsc-part1-kpk:sol:unit01
- o to==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-2-p3|< Question 3 & 4]]<... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-2-p5|Question 6 >]]</bt
- Question 6, Exercise 1.2 @fsc-part1-kpk:sol:unit01
- To ==== <text align="left"><btn type="primary">[[fsc-part1-kpk:sol:unit01:ex1-2-p4|< Question 5]]</btn... </text> <text align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-2-p6|Question 7 >]]</bt