Answer:
1) 3
2) {x = 9 or x = -1}
3) (b) The modulus of the complex number 5-3i is [tex]\sqrt{34}[/tex]
Step-by-step explanation:
Problem 1
3 - 2 [tex]\frac{\sqrt{11} }{2} + \sqrt{11}[/tex]
i) Cancelling out the 2's from the top and bottom of the middle term, we get
3 - [tex]\sqrt{11} + \sqrt{11}[/tex]
ii) Cancelling out -[tex]\sqrt{11}[/tex] and +[tex]\sqrt{11}[/tex], we get
3 as the simplified form
Problem 2
x-1 = [tex]\sqrt{6x+10}[/tex]
Our first goal is to get rid off the radical on the right side
i) Squaring both sides, we get
[tex](x-1)^{2}[/tex]=[tex](\sqrt{6x+10})^{2}[/tex]
ii) (x-1)*(x-1) = 6x+10
iii) Applying the distributive property (a+b)(c+d) = ac+ad+bc+bd to the left side of the equation, we get
(x)(x)+(x)(-1)+(-1)(x)+(-1)(-1) = 6x+10
=> [tex]x^{2}[/tex]-x-x+1 = 6x+10
=> [tex]x^{2}[/tex]-2x+1 = 6x+10
iv) Subtract 6x from both sides, we get
[tex]x^{2}[/tex]-2x+1-6x = 6x+10-6x
v) Cancelling out 6x and -6x from the right side, we get
[tex]x^{2}[/tex]-2x-6x+1 = 10
=> [tex]x^{2}[/tex]-8x+1 = 10
vi) Subtracting 10 from both the sides, we get
[tex]x^{2}[/tex]-8x+1-10 = 10-10
vii) Cancelling out 10 and 10 from the right side, we have
[tex]x^{2}[/tex]-8x-10+1 = 0
=> 1[tex]x^{2}[/tex]-8x-9 = 0
viii) Coefficient of the first term = 1
Multiplying the coefficient of the first term and the last term, we get
1*(-9) = -9
We need to find out two such factors of -9 which when added should give the middle term -8
So, -9 and +1 are the two factors of -9 which when added gives us the middle term -8
ix) Rewriting the middle term, we get
[tex]x^{2}[/tex]-9x+x-9 = 0
x) Factoring out x from the first two terms and factoring out 1 from the last two terms, we get
x(x-9)+1(x-9)=0
xi) Factoring out x-9 from both the terms, we get
(x-9)(x+1)=0
xii) Either x-9=0 or x+1=0
xiii) Solving x-9=0, we get x=9
xiv) Solving x+1=0, we get x= -1
So, solution set {x = 9 or x = -1}
Problem 3
5 − 3i
a) In order to graph the complex number 5-3i, we need to move right by 5 units on the real axis and then move down by 3 units on the imaginary axis.
See figure attached
b) A complex number is in the form of z= a+ bi
i) Comparing 5-3i with a+bi, we get a=5 and b = -3
The modulus is given by
|z| = [tex]\sqrt{a^{2}+b^{2} }[/tex]
ii) Plugging in a=5 and b=-3, we get
|z| = [tex]\sqrt{5^{2}+(-3)^{2} }[/tex]
iii) |z| = [tex]\sqrt{25+9} [/tex]
iv) |z| = [tex]\sqrt{34}[/tex]
The modulus of the complex number 5-3i is [tex]\sqrt{34}[/tex]
