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The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e 8 * 8 + 5 * 5 = 6989.
Okay, I figured it out. It will be 8589.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e 8 * 8 + 5 * 5 = 69.
Okay, I figured it out. It will be 8589.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e 8 * 8 + 5 * 5 = 89.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e $8 \times 8 + 5 \times 5 = 69$8 * 8 + 5 * 5 = 69.
Okay, I figured it out. It will be 8589.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e $8 \times 8 + 5 \times 5 = 69$.
Okay, I figured it out. It will be 8589.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e 8 * 8 + 5 * 5 = 69.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e 88 + 55 = 69$8 \times 8 + 5 \times 5 = 69$.
Okay, I figured it out. It will be 8589.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e 88 + 55 = 69.
Okay, I figured it out. It will be 8589.
The first and second digits are explained in the question itself, then we just have to calculate the summation of the squares of the first digit and second digit. i.e $8 \times 8 + 5 \times 5 = 69$.
