Question

find the quotient.
9,276 ÷ 8
a furniture store
received an order for
8,367 tables. they
can fit 7 tables in one
large shipping box.

Explanation:

First Sub - Question: Find the Quotient of \(9276\div8\) (assuming the comma is a thousands separator, so the number is 9276)

Step 1: Divide the thousands and hundreds place

We start by dividing 9 (thousands place) by 8. \(9\div8 = 1\) with a remainder of \(1\). Bring down the 2 (hundreds place) to make the number \(12\).

Step 2: Divide the new number

\(12\div8=1\) with a remainder of \(4\). Bring down the 7 (tens place) to make the number \(47\).

Step 3: Divide the new number

\(47\div8 = 5\) with a remainder of \(7\). Bring down the 6 (ones place) to make the number \(76\).

Step 4: Divide the last number

\(76\div8=9\) with a remainder of \(4\). Now, we can write the result as a decimal. We add a decimal point and a zero to the remainder, making it \(40\).

Step 5: Continue dividing

\(40\div8 = 5\).
So, putting it all together, \(9276\div8=1159.5\)

Second Sub - Question: (Incomplete, but assuming we need to find the number of boxes for 8367 tables with 7 tables per box)

To find the number of boxes, we divide the total number of tables by the number of tables per box. So we calculate \(8367\div7\).

Step 1: Divide the thousands and hundreds place

\(8\div7 = 1\) with a remainder of \(1\). Bring down the 3 (hundreds place) to make \(13\).

Step 2: Divide the new number

\(13\div7 = 1\) with a remainder of \(6\). Bring down the 6 (tens place) to make \(66\).

Step 3: Divide the new number

\(66\div7 = 9\) with a remainder of \(3\). Bring down the 7 (ones place) to make \(37\).

Step 4: Divide the last number

\(37\div7 = 5\) with a remainder of \(2\). If we want a decimal, we add a zero and get \(20\div7\approx2.857\). But if we want the number of full boxes, it's \(1195\) with a remainder of \(2\) tables, so we need \(1196\) boxes to ship all tables.

Answer:

First quotient: \(1159.5\)
(Second answer depends on the complete question, but for the division \(8367\div7 = 1195.2857\cdots\) or \(1196\) boxes if we consider full boxes needed)