The product of 2-digit numbers is 5925. if the product of their unit digits is 45 and that of their tens digits is 21. find the number
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Answer:
let the two no. are xy and mn
Step-by-step explanation:
ATQ.
xy×mn= 5925----1
yn=45------2
xm=21------3
so using 1
xy×mn=5925
(10x+y) ×(10m+n)=5925
100xm+10xn+10my+yn=5925
100×21+10(xn+my)+45=5925
10(xn+my)+2145=5925
xn+my=378------4
Adding 2 and 3
xm+yn=66----5
further you solve this question by yourself
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