Let us note down the given details
Sum of two numbers = \( \dfrac{-4}{3}\)
One of the number = \( \dfrac{-5}{1}\)
By using the formula,
Other number = sum of number – given number
= \( \dfrac{-4}{3}- \dfrac{-5}{1}\)
By taking LCM for 3 and 1 which is 3
\( \dfrac{-5}{1}=\dfrac{(-4×1 – -5×3)}{3}\)
= \(\dfrac{ (-4 + 15)}{3}\)
= \( \dfrac{11}{3}\)
the other number is \( \dfrac{11}{3}\)
Answered by Aaryan | 1 year agoBy what number should 1365 be divided to get 31 as quotient and 32 as remainder?
Which of the following statement is true / false?
(i) \(\dfrac{ 2 }{ 3} – \dfrac{4 }{ 5}\) is not a rational number.
(ii) \( \dfrac{ -5 }{ 7}\) is the additive inverse of \( \dfrac{ 5 }{ 7}\)
(iii) 0 is the additive inverse of its own.
(iv) Commutative property holds for subtraction of rational numbers.
(v) Associative property does not hold for subtraction of rational numbers.
(vi) 0 is the identity element for subtraction of rational numbers.
If x = \( \dfrac{4 }{ 9}\), y =\( \dfrac{-7 }{ 12}\) and z = \( \dfrac{-2 }{ 3}\), then verify that x – (y – z) ≠ (x – y) – z
If x = \(\dfrac{ – 4 }{ 7}\) and y = \( \dfrac{2 }{ 5}\), then verify that x – y ≠ y – x
Subtract the sum of \(\dfrac{ – 5 }{ 7} and\dfrac{ – 8 }{ 3}\) from the sum of \(\dfrac{5 }{ 2} and \dfrac{– 11 }{ 12}\)