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- Multiple Choice Questions (MCQs)
- \neq 0$ * (C) $a=b=0$ * (D) $b=$ any real number * An open sentence formed by using a sign of '=... rem </col> <col sm="6"> * An arrangement of the number according to some definite rule is called * (... \neq 0$ * (C) $a=b=0$ * (D) $b=$ any real number * $n!=n(n-1)(n-2)...3\cdot 2\cdot 1$ defined o... positive integer * (B) integer * (C) real number * (D) whole number * If the angle of rotat
- Question 2 & 3, Review Exercise 1 @fsc-part1-kpk:sol:unit01
- gn} =====Question 3(i)===== Express the complex number $\left( 1+3i \right)+\left( 5+7i \right)$ in the... 0i$ =====Question 3(ii)===== Express the complex number $\left( 1+3i \right)-\left( 5+7i \right)$ in the... n} =====Question 3(iii)===== Express the complex number $\left( 1+3i \right)\left( 5+7i \right)$ in the ... gn} =====Question 3(iv)===== Express the complex number $\dfrac{\left( 1+3i \right)}{\left( 5+7i \right)}
- Unit 1: Complex Numbers (Solutions) @fsc-part1-kpk:sol
- e students will be able to * Recall complex number $z$ represented by an expression of the form $z=a... 2}$ as the absolute value or modulus of a complex number $z=a+ib$ * Describe algebraic properties of c... where $p,q,r$ are real numbers and $z$ a complex number. <panel type="default" title="Exercise 1.1 (Solu
- Question 4, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- ===Question 4(i)===== Subtract the second complex number from first $\left( a,0 \right)\left( 2,-b \right)... ==Question 4(ii)===== Subtract the second complex number from first $\left( -3,\dfrac{1}{2} \right)\left( ... =Question 4(iii)===== Subtract the second complex number from first $3\sqrt{3}-5\sqrt{7}i,\sqrt{3}+2\sqrt{
- Question 5, Exercise 1.1 @fsc-part1-kpk:sol:unit01
- tan. =====Question 5(i)===== Multiply the complex number $8i+11,-7+5i$. ====Solution==== \begin{align}&(8i... n} =====Question 5(ii)===== Multiply the complex number $3i,2\left( 1-i \right)$. ====Solution==== \begin... } =====Question 5(iii)===== Multiply the complex number $\sqrt{2}+\sqrt{3i},2\sqrt{2}-\sqrt{3i}$. ====Sol
- Definitions: FSc Part1 KPK
- * **Period:** period is the smallest positive number which, when added to the original circular measur... iod of Trigonometric Function:** The smallest +ve number which when added to the original circular measure
- Question 3 & 4, Exercise 1.2 @fsc-part1-kpk:sol:unit01
- dditive and multiplicative inverse of the complex number $5+2i$. ====Solution==== Given $z=5+2i$. Here $a... dditive and multiplicative inverse of the complex number $\left( 7,-9 \right)$. ====Solution==== Given $z=