Let `n` be a four-digit integer in which all the digits are different. If `x` is number of odd integers and `y` is number of even integers, then a. `x y` c. `x+y=4500` d. `|x-y|=54`

Let n be 4-digit integer in which all the digits are different. If x is the number of odd integers and y is the number of even integers, then

Let n be 4-digit integer in which all the digits are different. If x is the number of odd integers and y is the number of even integers, then

Let n be 4-digit integer in which all the digits are different. If x is the number of odd integers and y is the number of even integers, then

Let n be 4-digit integer in which all the digits are different. If x is the number of odd integers and y is the number of even integers, then

Let n be 4-digit integer in which all the digits are different. If x is the number of odd integers and y is the number of even integers, then a. x b. x>y c. x+y = 4500 d. |x-y| = 56

Let n be a four-digit integer in which all the digits are different. If x is number of odd integers and y is number of even integers, then a. x less than y b. x greater than y c. x+y=4500 d. |x-y|=54

Let n be a four-digit integer in which all the digits are different. If x is number of odd integers and y is number of even integers, then a. x less than y b. x greater than y c. x+y=4500 d. |x-y|=54

If x is positive even integer and y is negative odd integer, then x^(y) is

The number of six-digit numbers which have sum of their digits as an odd integer, is

Check whether the following statement are true or not: p: If x and y are odd integers, then x+y is an even integer.