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George Green · Answer 1 · 2021-05-10T12:41:04+0000

Explanation:

Let the first multiple of 4 be x and second multiple be (x + 4) and third multiple be (x + 8) ...[Since, the number are consecutive multiple of 4]

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$\underline{\boldsymbol{According\: to \:the\: Question\:now :}}\\$

$:\implies \sf x \: + \: x \: + \: 4 \: + \: x \: + \: 8 \: = \: 444 \\ \\ \\$

$:\implies \sf 3x \: + \: 12 \: = \: 444 \\ \\ \\$

$:\implies \sf 3x \: = \: 444 \: - \: 12 \\ \\ \\$

$:\implies \sf 3x \: = \: 432 \\ \\ \\$

$:\implies \sf x \: = \: (432)/(3) \\ \\ \\$

$:\implies\underline{ \boxed{\sf x \: = \: 144}} \\$

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Therefore,

$\bullet\:\:\textsf{First multiple of 4 = x = \textbf{144}} \\$

$\bullet\:\:\textsf{Second multiple of 4 = x + 4 = 144 + 4 = \textbf{148}} \\$

$\bullet\:\:\textsf{Third multiple of 4 = x + 8 = 144 + 8 = \textbf{152}}$

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Therefore,

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