Question

Expand using exponents 6054.321

Answer 1

Answer:

6+0+5+4+3+2+1

Step-by-step explanation:

Answer 2

The expanded form of 6054.321 is

$(6\times 10^3)+(0\times 10^2)+(5\times 10^1)+(4\times 10^0)+(3\times 10^-^1)+(2\times 10^-^2)+(1\times 10^-^3)$

Step-by-step explanation:

given number = 6054.321

expanding using exponents

6054.321

= $(6\times 10^3)+(0\times 10^2)+(5\times 10^1)+(4\times 10^0)+(3\times \frac{1}{10} )+(2\times \frac{1}{100} )+(1\times \frac{1}{1000} )$

we can also write it as

$\frac{1}{10} = 10^-^1$

$\frac{1}{100} = 10^-^2$

$\frac{1}{1000} = 10^-^3$ (As the exponent decreases by 1, the value becomes

one-tenth of the previous value.)

therefore,

The expanded form of 6054.321 is

=$(6\times 10^3)+(0\times 10^2)+(5\times 10^1)+(4\times 10^0)+(3\times 10^-^1)+(2\times 10^-^2)+(1\times 10^-^3)$

#Learn more:

Expand 891.034 using exponent

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