Negative Numbers
Class 8th Mathematics Part Ii Kerala Board Solution
- 5 - 10 Use the principles above, compute the following:
- 5 - 10 Use the principles above, compute the following:
- -10 + 5 Use the principles above, compute the following:
- -5 - 10 Use the principles above, compute the following:
- -5 - 5 Use the principles above, compute the following:
- -5 + 5 Use the principles above, compute the following:
- - 1/2 + 1 1/2 Use the principles above, compute the following:
- - 1/2 - 1 1/2 Use the principles above, compute the following:
- - 1/2 + 1/2 Use the principles above, compute the following:
- (1 + x) + (1 - x) = 2 Take as x different positive numbers, negative numbers and zero,…
- x - (x - 1) = 1 Take as x different positive numbers, negative numbers and zero, and…
- 1 - x = - (x - 1) Take as x different positive numbers, negative numbers and zero, and…
- (x + y) - x = y Taking different numbers as x, y and compute x + y, x - y. Check…
- (x + y) - y = x Taking different numbers as x, y and compute x + y, x - y. Check…
- (x - y) + y = x Taking different numbers as x, y and compute x + y, x - y. Check…
- -x + (x + 1) = 1 Check whether the equations are identities. Write the patterns got…
- -x + (x + 1) + (x + 2) - (x + 3) = 0 Check whether the equations are identities. Write…
- -x - (x + 1) + (x + 2) + (x + 3) = 4 Check whether the equations are identities. Write…
- Taking different numbers, positive negative and zero, as x, y, z and compute x + (y +…
- Take various positive and negative numbers as x, y, z and compute (x + y)z and xz + yz.…
- y = x^2 , x = -5, x = 5 In each of the following equations, take x as the given numbers…
- y = x^2 + 3x + 2, x = -2 In each of the following equations, take x as the given numbers…
- y = x^2 + 5x + 4, x = -2, x = -3 In each of the following equations, take x as the given…
- y = x^3 + 1, x = -1 In each of the following equations, take x as the given numbers and…
- y = x^3 + x^2 + x + 1, x = -1 In each of the following equations, take x as the given…
- For a point starting at a point P and travelling along a straight line, time of travel is…
- Natural numbers, their netiaves and zero are together called intergers. How many pairs of…
- In the equation y = 1/x take z as the numbers - 2/3 , - 1/2 , - 3/5 and compute y.…
- In the equation y = 1/x-1 + 1/x+1 take x = -2 and x = - 1/2 and compute y.…
- In the equation z = x/y - y/x take x as the numbers given below and calculate the…
- In the equation z = x/y - y/x take x as the numbers given below and calculate the…
- In the equation z = x/y - y/x take x as the numbers given below and calculate the…
- In the equation z = x/y - y/x take x as the numbers given below and calculate the…
- In the equation z = x/y - y/x take x as the numbers given below and calculate the…
Questions Pg-165
Question 1.Use the principles above, compute the following:
5 – 10
Answer:
Using the principle, for any two positive numbers x,y, we write,
-x + y = y-x
⇒ 5-10 = -5
Note: The sign of bigger number will come in the result.
Question 2.
Use the principles above, compute the following:
5 – 10
Answer:
Using the principle, for any two positive numbers x,y, we write,
-x + y = y-x
⇒ 5-10 = -5
Note: The sign of bigger number will come in the result.
Question 3.
Use the principles above, compute the following:
–10 + 5
Answer:
Using the principle, for any two positive numbers x,y, we write,
-x + y = y-x
-10 + 5 can be written as,
⇒ 5-10
⇒ 5-10 = -5
Note: The sign of bigger number will come in the result.
Question 4.
Use the principles above, compute the following:
–5 – 10
Answer:
Using the principle, For any two positive numbers x,y, we write,
-x-y = -(x + y)
⇒ -(5 + 10) = -(15)
Note: If both numbers are negative then result also will be negative.
Question 5.
Use the principles above, compute the following:
–5 – 5
Answer:
Using the principle, For any two positive numbers x,y, we write,
-x-y = -(x + y)
⇒ -(5 + 5) = -10
Note: If both numbers are negative then result also will be negative.
Question 6.
Use the principles above, compute the following:
–5 + 5
Answer:
Using the principle, for any two positive numbers x,y, we write,
-x + y = y-x
⇒ 5-5 = 0
Note: A number and it’s negative addition result in null and also called additive inverse.
Question 7.
Use the principles above, compute the following:
Answer:
⇒
⇒ 
⇒1
Note: The sign of bigger number will come in the result.
Question 8.
Use the principles above, compute the following:
Answer:
⇒ 
⇒ 
⇒ -2
Note: If both fractions are negative then result also will be negative.
Question 9.
Use the principles above, compute the following:
Answer:
⇒ 
⇒ 
= 0
Note: if a fraction and its negative are added then their result is 0.
Questions Pg-170
Question 1.Take as x different positive numbers, negative numbers and zero, and compute x + 1, x – 1, 1 – x. Check whether the equations below hold for all numbers.
(1 + x) + (1 – x) = 2
Answer:
Let take as positive numbers as: 1,2,3,4
Negative numbers: - 1,-2,-3,-4 and 0
For positive number:
(x + 1) = 1 + 1, 2 + 1 ,3 + 1 ,4 + 1
= 2,3,4,5
(x-1) = 1-1, 2-1 ,3-1 ,4-1
= 0, 1, 2, 3
(1-x) = 1-1, 1-2, 1-3, 1-4
= 0, -1, -2, -3
(i) (1 + x) + (1-x) = 2
Let’s check for x = 1
L.H.S = (1 + 1) + (1-1)
= 2 + 0
= 2
= R.H.S
Hence, it works for x = 2
Let’s check for x = 3
L.H.S = (1 + 3) + (1-3)
= 4 – 2
= 2
= R.H.S
Hence, it works for x = 3
Similarly, we can check for other values too. It will follow.
Question 2.
Take as x different positive numbers, negative numbers and zero, and compute x + 1, x – 1, 1 – x. Check whether the equations below hold for all numbers.
x – (x – 1) = 1
Answer:
x – (x – 1) = 1
Let’s check for x = -1
L.H.S = -1-(-1-1)
= -1-(-2)
= 1
= R.H.S
Hence, it works for x = -1
Let’s check for x = -2
L.H.S = -2 - (-2-1)
= -2 – (-3)
= 1
= R.H.S
Hence, it works for x = -2
Let’s check for x = -3
L.H.S = -3 – (-3 - 1)
= -3 – (-4)
= 1
= R.H.S
Hence, it works for x = -3
Similarly we can check for other values too. It will follow.
Question 3.
Take as x different positive numbers, negative numbers and zero, and compute x + 1, x – 1, 1 – x. Check whether the equations below hold for all numbers.
1 – x = – (x – 1)
Answer:
1 – x = – (x – 1)
Let’s check for x = 0
L.H.S = 1 – 0
= 1
R.H.S = -(0 - 1)
= 1
= L.H.S
Hence, it works for x = 0
Let’s check for x = 1
L.H.S = 1 – 1
= 0
R.H.S = - (1 - 1)
= 0
= L.H.S
Hence, it works for x = 1
Let’s check for x = 2
L.H.S = 1 – 2
= -1
R.H.S = - (2 - 1)
= -1
= L.H.S
Hence, it works for x = 2
Similarly we can check for other values too. It will follow.
Question 4.
Taking different numbers as x, y and compute x + y, x – y. Check whether the following hold for all kinds of numbers.
(x + y) – x = y
Answer:
Let’s take x as : 1,2,3,4
And respectively y as : -1,-2,-3,-4
For x = 1 and y = -1:
(x + y) = (1 - 1) = 0
(x - y) = (1 – (-1)) = 2
For x = 2 and y = -2:
(x + y) = (2 - 2) = 0
(x - y) = (2 – (-2)) = 4
For x = 3 and y = -3:
(x + y) = (3 - 3) = 0
(x - y) = (3 – (-3)) = 6
For x = 4 and y = -4
(x + y) = (4 - 4) = 0
(x - y) = (4 – (-4)) = 8
(i) (x + y) – x = y
Let’s check for x = 1 and y = -1
L.H.S = (1 + (-1)) – 1
= (0) – 1
= -1
R.H.S = y
= -1
= L.H.S
Hence, it holds for x = 1 and y = -1
Let’s check for x = 2 and y = -2
L.H.S = (2 + (-2)) – 2
= (0) – 2
= -2
R.H.S = -2
= L.H.S
Hence, it works for x = 2 and y = -2
Similarly we can check for other values too. It will follow.
Question 5.
Taking different numbers as x, y and compute x + y, x – y. Check whether the following hold for all kinds of numbers.
(x + y) – y = x
Answer:
(x + y) – y = x
Let’s check for x = 3 and y = -3
L.H.S = (3 + (-3)) – (-3)
= (0) + 3
= 3
R.H.S = 3
= L.H.S
Hence, it works for x = 3 and y = -3
Let’s check for x = 4 and y = -4
L.H.S = (4 + (-4)) – (-4)
= (0) + 4
= 4
R.H.S = 4
= L.H.S
Hence, it works for x = 4 and y = -4
Similarly, we can check for other values too. It will follow.
Question 6.
Taking different numbers as x, y and compute x + y, x – y. Check whether the following hold for all kinds of numbers.
(x – y) + y = x
Answer:
(x – y) + y = x
Let’s check for x = 1 and y = -1
L.H.S = (1 – (-1)) + (-1)
= (2) – 1
= 1
R.H.S = 1
= L.H.S
Hence, it works for x = 1 and y = -1
Let’s check for x = 2 and y = -2
L.H.S = (2 – (-2)) + (-2)
= (4) -2
= 2
R.H.S = 2
= L.H.S
Hence, it works for x = 2 and y = -2
Similarly we can check for other values too. It will follow.
Questions Pg-174
Question 1.Check whether the equations are identities. Write the patterns got form each,on taking x = 1, 2, 3, 4, 5 and x = –1, –2, –3, –4, –5.
–x + (x + 1) = 1
Answer:
Let’s take as x = 1,2,3,4,5 (positive numbers)
And as x = -1,-2,-3,-4,-5 (negative numbers)
(i) –x + (x + 1) = 1
We will calculate LHS in every case and compare it with RHS taking x = 1, = -1 + (1 + 1) = -1 + 2
= 1
Taking x = 2, = -2 + (2 + 1) = -2 + 3
= 1
taking x = 3,
= -3 + (3 + 1)
= -3 + 4 = 1
taking x = 4,
= -4 + (4 + 1)
= -4 + 5 = 1
taking x = 5,
= -5 + (5 + 1)
= -5 + 6 = 1
now taking x as negative numbers Taking x = -1, = -(-1) + (-1 + 1)
= 1 – 1 + 1 = 1
Taking x = -2, = -(-2) + (-2 + 1)
= 2 + 1 -2 = 1
Taking x = -3, = -(-3) + (-3 + 1)
= 3 -3 + 1 = 1
Taking x = -4, = -(-4) + (-4 + 1)
= 4 -4 + 1 = 1
Taking x = -5, = -(-5) + (-5 + 1)
= 5 – 5 + 1 = 1
As in each case LHS = 1 so, LHS = RHS
Hence, above equation is an identity.
Question 2.
Check whether the equations are identities. Write the patterns got form each,on taking x = 1, 2, 3, 4, 5 and x = –1, –2, –3, –4, –5.
–x + (x + 1) + (x + 2) – (x + 3) = 0
Answer:
–x + (x + 1) + (x + 2) – (x + 3) = 0
We will calculate LHS in every case and copare it with LHS
Taking x = 1,
= -1 + (1 + 1) + (1 + 2)-(1 + 3)
= -1 + 2 + 3-4
= 0
Taking x = 2,
= -2 + (2 + 1) + (2 + 2)-(2 + 3)
= -2 + 3 + 4-5
= 0
Taking x = 3,
= -3 + (3 + 1) + (3 + 2)-(3 + 3)
= -3 + 4 + 5-6
= 0
Taking x = 4,
= -4 + (4 + 1) + (4 + 2)-(4 + 3)
= -4 + 5 + 6-7
= 0
Taking x = 5,
= -5 + (5 + 1) + (5 + 2)-(5 + 3)
= -5 + 6 + 7-8
= 0
Taking x = -1,
= -(-1) + (-1 + 1) + (-1 + 2)-(-1 + 3)
= 1 + 0 + 1-2
= 0
Taking x = -2,
= -(-2) + (-2 + 1) + (-2 + 2)-(-2 + 3)
= 2-1 + 0-1
= 0
Taking x = -3,
= -(-3) + (-3 + 1) + (-3 + 2)-(-3 + 3)
= 3-2-1 + 0
= 0
Taking x = -4,
= -(-4) + (-4 + 1) + (-4 + 2)-(-4 + 3)
= 4-3-2 + 1
= 0
Taking x = -5,
= -(-5) + (-5 + 1) + (-5 + 2)-(-5 + 3)
= 5-4-3 + 2
= 0
As in each case in LHS = 0 so, LHS = RHS
Hence, above equation is an identity.
Question 3.
Check whether the equations are identities. Write the patterns got form each,on taking x = 1, 2, 3, 4, 5 and x = –1, –2, –3, –4, –5.
–x – (x + 1) + (x + 2) + (x + 3) = 4
Answer:
–x – (x + 1) + (x + 2) + (x + 3) = 4
We will calulate LHS in every case and compare it with RHS
Taking x = 1,
= -1-(1 + 1) + (1 + 2) + (1 + 3)
= -1-2 + 3 + 4
= 4
Taking x = 2,
= -2-(2 + 1) + (2 + 2) + (2 + 3)
= -2-3 + 4 + 5
= 4
Taking x = 3,
= -3-(3 + 1) + (3 + 2) + (3 + 3)
= -3-4 + 5 + 6
= 4
Taking x = 4,
= -4-(4 + 1) + (4 + 2) + (4 + 3)
= -4-5 + 6 + 7
= 4
Taking x = 5,
= -5-(5 + 1) + (5 + 2) + (5 + 3)
= -5-6 + 7 + 8
= 4
Taking x = -1,
= 1-(-1 + 1) + (-1 + 2) + (-1 + 3)
= 1 + 0 + 1 + 2
= 4
Taking x = -2,
= 2-(-2 + 1) + (-2 + 2) + (-2 + 3)
= 2 + 1 + 0 + 1
= 4
Taking x = -3,
= 3-(-3 + 1) + (-3 + 2) + (-3 + 3)
= 3 + 2-1 + 0
= 4
Taking x = -4,
= 4-(-4 + 1) + (-4 + 2) + (-4 + 3)
= 4 + 3-2-1
= 4
Taking x = -5,
= 5-(-5 + 1) + (-5 + 2) + (-5 + 3)
= 5 + 4-3-2
= 4
As in each case in LHS = 4 so, LHS = RHS
Hence, above equation is an identity.
Question 4.
Taking different numbers, positive negative and zero, as x, y, z and compute x + (y + z) and (x + y) + z. Check whether the equation, x + (y + z) = (x + y) + z holds for all these numbers.
Answer:
Let’s take x = 0,1,-1 y = 1,0,-1 and z = -1,1,0 respectively.
CASE 1: When x = 0, y = 1 and z = -1
Then, x + (y + z),
= 0 + (1-1)
= 0
CASE 2: When x = 1, y = 0 and z = 1
Then, x + (y + z)
= 1 + (0 + 1)
= 2
CASE 3: When x = -1, y = -1 and z = 0,
Then, x + (y + z)
= -1 + (-1 + 0)
= -2
Calculating (x + y) + z
CASE 1: When x = 0, y = 1 and z = -1
= (0 + 1) + (-1)
= 0
CASE 2:When x = 1, y = 0 and z = 1
= (1 + 0) + 1
= 2
CASE 3:When x = -1, y = -1 and z = 0
= (-1-1) + 0
= -2
Since, in every case x + (y + z) = (x + y) + z so,this holds for all these numbers.
Questions Pg-178
Question 1.Take various positive and negative numbers as x, y, z and compute (x + y)z and xz + yz. Check whether the equation (x + y)z = xz + yz holds for all these.
Answer:
let, take x = 0,1,-1 y = 1,0,-1 and z = -1,1,0 respectively.
CASE 1:When x = 0, y = 1, and z = -1,
(x + y)z = (0 + 1)-1
= 1×-1
= -1
CASE 2:When x = 1, y = 0, and z = 1,
(x + y)z = (1 + 0)1
= 1×1
= 1
CASE 3:When x = -1, y = -1, and z = 0,
(x + y)z = (-1-1)0
= -2×0
= 0
Calculating xz + yz
CASE 1:when x = 0, y = 1, and z = -1,
xz + yz = 0×-1 + 1×-1
= 0 - 1
= -1
CASE 2:When x = 1, y = 0 and z = 1,
xz + yz = 1×1 + 0×1
= 1 + 0
= 1
CASE 3: When x = -1, y = -1 and z = 0
Xz + yz = -1×0 + (-1×0)
= 0 + 0
= 0
As in all case (x + y)z = xz + yz hence, it will holds for all numbers.
Question 2.
In each of the following equations, take x as the given numbers and compute the numbers y.
y = x2, x = –5, x = 5
Answer:
1. y = x2, x = –5, x =2. 5
Putting x = -5,
y = (-5)
2 = -5×-5 = 25
Putting x = 5,
y = (5)2 = 5×5
= 25
Question 3.
In each of the following equations, take x as the given numbers and compute the numbers y.
y = x2 + 3x + 2, x = –2
Answer:
y = x2 + 3x + 2, x = –2
Putting y = -2,
Y = (-2)2 + 3×(-2) + 2
= 4-6 + 2
= 0
Question 4.
In each of the following equations, take x as the given numbers and compute the numbers y.
y = x2 + 5x + 4, x = –2, x = –3
Answer:
y = x2 + 5x + 4, x = –2, x = –3
When x = -2,
y = (-2)2 + 5×-2 + 4
= 4-10 + 4
= -2
When x = -3,
y = (-3)2 + 5×-3 + 4
= 9-15 + 4
= -2
Question 5.
In each of the following equations, take x as the given numbers and compute the numbers y.
y = x3 + 1, x = –1
Answer:
y = x3 + 1, x = –1
Putting x = -1,
y = (-1)3 + 1
= 0
Question 6.
In each of the following equations, take x as the given numbers and compute the numbers y.
y = x3 + x2 + x + 1, x = –1
Answer:
y = x3 + x2 + x + 1, y = –1
putting y = -1,
y = (-1)3 + (-1)2-1 + 1
y = -1 + 1 -1 + 1
= 0
Question 7.
For a point starting at a point P and travelling along a straight line, time of travel is taken as t and the distance from P as s. The relation between s and t is found to be s = 12t – 2t2, there distances to the right are taken as positive numbers and to the left as negative numbers.
(i) Is the position of the point to the right or left of P, till 6 seconds?
(ii) Where is the position at 6 seconds?
(iii) After 6 seconds?
Here it is convenient to write 12t – 2t2 = 2t(6 – t).
Answer:
s = 12t – 2t2
(i) when t = 6, s = 12×6-2(6)2
= 72-36×2
= 0
Thus, it is neither left nor right of point P.
(ii) s = 2t(6-t)
At t = 6s,
s = 2×6(6-6) = 0
Hence, it is at point P.
(iii) s = 12t- 2t2 it can have written as 2t(6-t)
After 6 seconds the term (6-t) will be negative
At t = 7 s = 2×7(6-7)
s = 14 ×-1
s = -14
At t = 8 s = 2×8(6-8)
s = 16× -2
s = -32
It will be left of point P after t = 6 seconds
Question 8.
Natural numbers, their netiaves and zero are together called intergers. How many pairs of integers are there, satisfying the equation, x2 + y2 = 25 ?
Answer:
We have to find how many pairs of integers are there, satisfying the equation, x2 + y2 = 25
When x = 0, 0 + y2 = 25 so, y = + 5,-5
Same will be for when y = 0, x2 + 0 = 25 so, x = 5,-5
By hit and trial we can also find 9 + 16 or 16 + 9 = 25
So, x = 3,-3,4,-4 and respective y = 4,-4,3,3
So pairs are (0,5),(0,-5),(5,0),(-5,0),(3,4),(-3,4),(4,3),(4,-3),(-4,-3),(-3,-4).
Questions Pg-180
Question 1.In the equation 
take z as the numbers 
and compute y.
Answer:
y = 
and x = 
when x = 
y = 
so, y = -
when x = -
y = 
so, y = -2
when x = -
y = 
so, y = -
Question 2.
In the equation 
take x = –2 and 
and compute y.
Answer:
When x = -2 : y = 
So, y = 
+ (-1) y = -1-
= -
When x = -
: y = 
so, y = 
So, y = + 2 =
Question 3.
In the equation 
take x as the numbers given below and calculate the number z.
x = 10, y = –5
Answer:
When x = 10, y = –5
Then, z = 
-
so, z = -2 +
z = 
Question 4.
In the equation 
take x as the numbers given below and calculate the number z.
x = –10, y = 5
Answer:
when x = –10, y = 5
then, z = 
-
so, z = -2 +
z =
Question 5.
In the equation take x as the numbers given below and calculate the number z.
x = –10, y = –5
Answer:
when x = –10, y = –5
then, z = 
-
so, z = 2-
z =
Question 6.
In the equation take x as the numbers given below and calculate the number z.
x = 5, y = –10
Answer:
when x = 5, y = –10
then, z = - so, z = 2-
z =
Question 7.
In the equation take x as the numbers given below and calculate the number z.
x = –5, y = 10
Answer:
when x = –5, y = 10
then, z = -
so, z = -2-
z = 