Advertisements
Advertisements
प्रश्न
Find the value of the letters in the following question.
A B
× A B
6 A B
उत्तर
A B
Given, × A B
6 A B
i.e. AB × AB = 6AB ...(i)
Here, B × B is a number whose unit’s digit is B.
Therefore, B = 1 or 5
Again, AB × AB = 6AB ...[∵ B ≠ 0, else AB × A ≠ 6A]
⇒ The square of a two-digit number is a three-digit number.
So, A can take values 1, 2 and 3.
For A = 1, 2, 3 and B = 1, equation (i) is not satisfied.
Now, for A = 1, B = 5, equation (i) is not satisfied.
We find that A = 2, B = 5 satisfies the equation (i).
Hence, A = 2, B = 5
APPEARS IN
संबंधित प्रश्न
Find the values of the letters in the following and give reasons for the steps involved.
A 1
+ 1 B
-------
B 0
-------
Find the values of the letters in the following and give reasons for the steps involved.
2 A B
+ A B 1
---------
B 1 8
----------
If 1AB + CCA = 697 and there is no carry-over in addition, find the value of A + B + C.
Find the value of the letters in the following question.
8 5
+ 4 A
B C 3
Find the value of the letters in the following question.
A 0 1 B
+ 1 0 A B
B 1 0 8
212 × 5 is a multiple of 3 and 11. Find the value of x.
Let E = 3, B = 7 and A = 4. Find the other digits in the sum
B A S E
+ B A L L
G A M E S
Let D = 3, L = 7 and A = 8. Find the other digits in the sum
M A D
+ A S
+ A
B U L L
If from a two-digit number, we subtract the number formed by reversing its digits then the result so obtained is a perfect cube. How many such numbers are possible? Write all of them.
Work out the following multiplication.
12345679
× 9
Use the result to answer the following question.
What will be 12345679 × 45?
