In a given year, about 1.52 x 10^(10) pieces of first-class mail are delivered in the U.S. If each piece of mail carries a stamp costing $0.55, what is the total cost in dollars to deliver all the pieces? Write the answer in scientific notation, expressed to the exact decimal place. (1 point)

To find the total cost, we can multiply the number of pieces of mail by the cost per piece.

Number of pieces of mail = 1.52 x 10^(10)
Cost per piece = $0.55

Total cost = (1.52 x 10^(10)) x ($0.55)

To multiply numbers in scientific notation, we multiply the coefficients and add the exponents:
Total cost = (1.52) x (0.55) x 10^(10)

Multiplying the coefficients:
Total cost = 0.836 x 10^(10)

In scientific notation, the coefficient is typically between 1 and 10, so we can rewrite 0.836 as 8.36 x 10^(-1). We will also adjust the exponent accordingly:
Total cost = 8.36 x 10^(-1) x 10^(10)

Adding the exponents:
Total cost = 8.36 x 10^(10-1)

Simplifying the exponent:
Total cost = 8.36 x 10^9

Therefore, the total cost in dollars to deliver all the pieces of mail is $8.36 x 10^9.