1ii) A is false bulls lu.12. ASSERTION (A)+ 1 =111 11REASONING (R): If we divide a fraction by itself, the quotient is always 1.i) A is true but R is false.ii) Both A and Rare true.iii) A is false but R is true.iv) Both A and Rare false. About the author Lyla
Answer: One points measure – 3.2cm Other part measure – 8cm Explanation\huge \mathfrak \pink{Explanation}Explanation ➻Sum of ratio – 5 ➻Measure of the line ➻ 8cm ÷ 5 = 1.6cm ➻ ratio of part is 2:5 ➻ measure of one part → 1.6cm × 2 = 3.2cm ➻ measure of other part → 1.6cm × 3 = 4.8cm hope it helps Reply
Answer: If and are positive integers, there exist unique integers and , called the quotient and remainder, respectively, such that and . For example, when 15 is divided by 6, the quotient is 2 and the remainder is 3 since . Notice that means that remainder is a non-negative integer and always less than divisor. This formula can also be written as . Reply
Answer:
One points measure – 3.2cm
Other part measure – 8cm
Explanation\huge \mathfrak \pink{Explanation}Explanation
➻Sum of ratio – 5
➻Measure of the line
➻ 8cm ÷ 5 = 1.6cm
➻ ratio of part is 2:5
➻ measure of one part → 1.6cm × 2 = 3.2cm
➻ measure of other part → 1.6cm × 3 = 4.8cm
hope it helps
Answer:
If and are positive integers, there exist unique integers and , called the quotient and remainder, respectively, such that and .
For example, when 15 is divided by 6, the quotient is 2 and the remainder is 3 since .
Notice that means that remainder is a non-negative integer and always less than divisor.
This formula can also be written as .