Dividend: 9876
Divisor: 123
Quotient: unknown
To find the quotient, we perform long division as follows:
80
___________
123| 9876
861
_____
1260
123
_______
370
370
______
0
The quotient is 80.
Create a divison probelm where the divisor, the dividend, and the quotient are multi-digit whole numbers
17 answers
create a divison problem where the divisor is a decimal and the dividend is awhole number.the quotient must be greater 10 but less than 11
Dividend: 98765
Divisor: 9.2
Quotient: unknown
To find the quotient, we perform long division as follows:
10706.
_______________
9.2| 98765
92.4
__
66.1
55.6
___
105.4
92
___
134
128.8
____
53.2
46
____
72
69.6
___
24.4
18.4
____
60
55.6
___
44.4
36.8
__
76
73.6
__
24.4
The quotient is approximately 10706. The decimal part is consistently repeating 4, which means the quotient is greater than 10 but less than 11.
Divisor: 9.2
Quotient: unknown
To find the quotient, we perform long division as follows:
10706.
_______________
9.2| 98765
92.4
__
66.1
55.6
___
105.4
92
___
134
128.8
____
53.2
46
____
72
69.6
___
24.4
18.4
____
60
55.6
___
44.4
36.8
__
76
73.6
__
24.4
The quotient is approximately 10706. The decimal part is consistently repeating 4, which means the quotient is greater than 10 but less than 11.
easier and shorter one pls
Dividend: 120
Divisor: 11.5
Quotient: unknown
To find the quotient, we perform long division as follows:
10.
_______________
11.5| 120
115
____
50
46
__
40
34.5
___
55
46
__
90
92
__
-2
The quotient is approximately 10.42. Since the quotient is greater than 10 but less than 11, this division problem satisfies the given conditions.
Divisor: 11.5
Quotient: unknown
To find the quotient, we perform long division as follows:
10.
_______________
11.5| 120
115
____
50
46
__
40
34.5
___
55
46
__
90
92
__
-2
The quotient is approximately 10.42. Since the quotient is greater than 10 but less than 11, this division problem satisfies the given conditions.
shorter
Dividend: 110
Divisor: 10.5
Quotient: unknown
To find the quotient, we perform long division as follows:
10.
_______________
10.5| 110
105
____
50
42
___
80
73.5
___
65
63
__
2
The quotient is approximately 10.47. Since the quotient is greater than 10 but less than 11, this division problem satisfies the given conditions.
Divisor: 10.5
Quotient: unknown
To find the quotient, we perform long division as follows:
10.
_______________
10.5| 110
105
____
50
42
___
80
73.5
___
65
63
__
2
The quotient is approximately 10.47. Since the quotient is greater than 10 but less than 11, this division problem satisfies the given conditions.
bruh, shorter
Dividend: 108
Divisor: 10.3
Quotient: unknown
To find the quotient, we perform long division as follows:
10.4
_______________
10.3| 108
103
___
5
___
The quotient is approximately 10.4. Since the quotient is greater than 10 but less than 11, this division problem satisfies the given conditions.
Divisor: 10.3
Quotient: unknown
To find the quotient, we perform long division as follows:
10.4
_______________
10.3| 108
103
___
5
___
The quotient is approximately 10.4. Since the quotient is greater than 10 but less than 11, this division problem satisfies the given conditions.
give me a step by step
Apologies for the confusion. Here's the step-by-step solution:
Dividend: 108
Divisor: 10.3
Quotient: unknown
To find the quotient, we perform long division as follows:
1. Start by dividing the leftmost digit of the dividend (1) by the divisor (10.3). The quotient should be a number greater than 0 but less than 1. In this case, the result is approximately 0.097.
0.097
_______________
10.3| 108
2. Multiply the quotient (0.097) by the divisor (10.3). The result is approximately 1.0001. Place this beneath the dividend, leaving a gap for subtraction.
0.097
_______________
10.3| 108
10.001
3. Subtract the result from step 2 (10.001) from the first portion of the dividend (108). The result is 107.999.
0.097
_______________
10.3| 108
10.001
________
107.999
4. Bring down the next digit of the dividend (0) and append it to the result from step 3 (107.999). This creates 1079.99.
0.097
_______________
10.3| 108
10.001
________
107.999
1.0799
5. Divide the new dividend (1079.99) by the divisor (10.3) to find the next decimal place of the quotient. The result is approximately 0.104.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
6. Multiply the new quotient (0.104) by the divisor (10.3) to get the decimal value under the line. The result is approximately 1.072.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
10.72
7. Subtract the result from step 6 (10.72) from the remaining portion of the dividend (79.99). The result is approximately 69.27.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
10.72
_________
69.271
8. Repeat steps 4-7 until the desired level of accuracy is achieved. Since we only need a quotient greater than 10 but less than 11, we can stop here.
The quotient is approximately 0.097. Since 1 divided by 0.097 is equal to approximately 10.309, this satisfies the condition of having a quotient greater than 10 but less than 11.
Dividend: 108
Divisor: 10.3
Quotient: unknown
To find the quotient, we perform long division as follows:
1. Start by dividing the leftmost digit of the dividend (1) by the divisor (10.3). The quotient should be a number greater than 0 but less than 1. In this case, the result is approximately 0.097.
0.097
_______________
10.3| 108
2. Multiply the quotient (0.097) by the divisor (10.3). The result is approximately 1.0001. Place this beneath the dividend, leaving a gap for subtraction.
0.097
_______________
10.3| 108
10.001
3. Subtract the result from step 2 (10.001) from the first portion of the dividend (108). The result is 107.999.
0.097
_______________
10.3| 108
10.001
________
107.999
4. Bring down the next digit of the dividend (0) and append it to the result from step 3 (107.999). This creates 1079.99.
0.097
_______________
10.3| 108
10.001
________
107.999
1.0799
5. Divide the new dividend (1079.99) by the divisor (10.3) to find the next decimal place of the quotient. The result is approximately 0.104.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
6. Multiply the new quotient (0.104) by the divisor (10.3) to get the decimal value under the line. The result is approximately 1.072.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
10.72
7. Subtract the result from step 6 (10.72) from the remaining portion of the dividend (79.99). The result is approximately 69.27.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
10.72
_________
69.271
8. Repeat steps 4-7 until the desired level of accuracy is achieved. Since we only need a quotient greater than 10 but less than 11, we can stop here.
The quotient is approximately 0.097. Since 1 divided by 0.097 is equal to approximately 10.309, this satisfies the condition of having a quotient greater than 10 but less than 11.
could u give me a different and easier step by step
Certainly! Here's a different and easier step-by-step solution:
Dividend: 242
Divisor: 23.5
Quotient: unknown
To find the quotient, we perform long division as follows:
1. Begin by dividing the leftmost digit of the dividend (2) by the divisor (23.5). The result is approximately 0.0851. Write this as the starting quotient.
0.0851
___________
23.5| 242
2. Multiply the quotient (0.0851) by the divisor (23.5). The result is approximately 1.99. Write this below the dividend.
0.0851
___________
23.5| 242
1.99
3. Subtract the result of step 2 (1.99) from the first portion of the dividend (242). The result is 240.01.
0.0851
___________
23.5| 242
1.99
______
240.01
4. Bring down the next digit of the dividend (4) and append it to the result from step 3 (240.01). This creates 240.014.
0.0851
___________
23.5| 242
1.99
______
240.01
4
5. Divide the new dividend (240.014) by the divisor (23.5) to find the next decimal place of the quotient. The result is approximately 10.214.
0.0851 (quotient so far)
___________
23.5| 242
1.99
______
240.01
4
23.5
6. Multiply the new quotient (10.214) by the divisor (23.5) to get the decimal value under the line. The result is approximately 239.031.
0.0851 (quotient so far)
___________
23.5| 242
1.99
______
240.01
4
23.5
________
239.031
7. Subtract the result of step 6 (239.031) from the remaining portion of the dividend (0.014). The result is approximately -238.017.
0.0851 (quotient so far)
___________
23.5| 242
1.99
______
240.01
4
23.5
________
239.031
-238.017
Since the remainder is negative, we stop here.
The quotient is approximately 0.0851. Since 1 divided by 0.0851 is equal to approximately 11.75, this satisfies the condition of having a quotient greater than 10 but less than 11.
Dividend: 242
Divisor: 23.5
Quotient: unknown
To find the quotient, we perform long division as follows:
1. Begin by dividing the leftmost digit of the dividend (2) by the divisor (23.5). The result is approximately 0.0851. Write this as the starting quotient.
0.0851
___________
23.5| 242
2. Multiply the quotient (0.0851) by the divisor (23.5). The result is approximately 1.99. Write this below the dividend.
0.0851
___________
23.5| 242
1.99
3. Subtract the result of step 2 (1.99) from the first portion of the dividend (242). The result is 240.01.
0.0851
___________
23.5| 242
1.99
______
240.01
4. Bring down the next digit of the dividend (4) and append it to the result from step 3 (240.01). This creates 240.014.
0.0851
___________
23.5| 242
1.99
______
240.01
4
5. Divide the new dividend (240.014) by the divisor (23.5) to find the next decimal place of the quotient. The result is approximately 10.214.
0.0851 (quotient so far)
___________
23.5| 242
1.99
______
240.01
4
23.5
6. Multiply the new quotient (10.214) by the divisor (23.5) to get the decimal value under the line. The result is approximately 239.031.
0.0851 (quotient so far)
___________
23.5| 242
1.99
______
240.01
4
23.5
________
239.031
7. Subtract the result of step 6 (239.031) from the remaining portion of the dividend (0.014). The result is approximately -238.017.
0.0851 (quotient so far)
___________
23.5| 242
1.99
______
240.01
4
23.5
________
239.031
-238.017
Since the remainder is negative, we stop here.
The quotient is approximately 0.0851. Since 1 divided by 0.0851 is equal to approximately 11.75, this satisfies the condition of having a quotient greater than 10 but less than 11.
MAN MAKE IT SHORTER PLESAE
Apologies for the lengthy response. Here's a shorter step-by-step solution:
Dividend: 242
Divisor: 23.5
Quotient: unknown
1. Divide the dividend (242) by the divisor (23.5). The result is approximately 10.3, which becomes the quotient.
10.3
___________
23.5| 242
2. Multiply the quotient (10.3) by the divisor (23.5). The result is approximately 242, which matches the dividend.
Since the quotient matches the dividend, the quotient is approximately 10.3. Since 10.3 is greater than 10 but less than 11, this satisfies the given conditions.
Dividend: 242
Divisor: 23.5
Quotient: unknown
1. Divide the dividend (242) by the divisor (23.5). The result is approximately 10.3, which becomes the quotient.
10.3
___________
23.5| 242
2. Multiply the quotient (10.3) by the divisor (23.5). The result is approximately 242, which matches the dividend.
Since the quotient matches the dividend, the quotient is approximately 10.3. Since 10.3 is greater than 10 but less than 11, this satisfies the given conditions.
THATS NOT THE EQUATION I AGVE YOU ITS, 108 DIVIDED BY 10.3
Apologies once again for the mistake. Here is the revised solution:
Dividend: 108
Divisor: 10.3
Quotient: unknown
To find the quotient, we perform long division as follows:
1. Divide the leftmost digit of the dividend (1) by the divisor (10.3). The result is approximately 0.097.
0.097
_______________
10.3| 108
2. Multiply the quotient (0.097) by the divisor (10.3). The result is approximately 1.0001, which we subtract from the dividend.
0.097
_______________
10.3| 108
10.001
3. Subtract the result from step 2 (10.001) from the first portion of the dividend (108). The result is 107.999.
0.097
_______________
10.3| 108
10.001
________
107.999
4. Bring down the next digit of the dividend (0) and append it to the result from step 3 (107.999). This creates 1079.99.
0.097
_______________
10.3| 108
10.001
________
107.999
1.0799
5. Divide the new dividend (1079.99) by the divisor (10.3) to find the next decimal place of the quotient. The result is approximately 0.104.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
Since we have achieved the desired level of accuracy and the quotient is greater than 10 but less than 11, the final quotient is approximately 0.097.
Apologies for the confusion earlier, and thank you for your patience.
Dividend: 108
Divisor: 10.3
Quotient: unknown
To find the quotient, we perform long division as follows:
1. Divide the leftmost digit of the dividend (1) by the divisor (10.3). The result is approximately 0.097.
0.097
_______________
10.3| 108
2. Multiply the quotient (0.097) by the divisor (10.3). The result is approximately 1.0001, which we subtract from the dividend.
0.097
_______________
10.3| 108
10.001
3. Subtract the result from step 2 (10.001) from the first portion of the dividend (108). The result is 107.999.
0.097
_______________
10.3| 108
10.001
________
107.999
4. Bring down the next digit of the dividend (0) and append it to the result from step 3 (107.999). This creates 1079.99.
0.097
_______________
10.3| 108
10.001
________
107.999
1.0799
5. Divide the new dividend (1079.99) by the divisor (10.3) to find the next decimal place of the quotient. The result is approximately 0.104.
0.097 (quotient so far)
_______________
10.3| 108
10.001
________
107.999
1.0799
10.4
Since we have achieved the desired level of accuracy and the quotient is greater than 10 but less than 11, the final quotient is approximately 0.097.
Apologies for the confusion earlier, and thank you for your patience.
3 answers