is Ibn Battuta's book, A Gift to Those Who Contemplate the Wonders of the Cities and Marvels of Traveling, so important to historians? (1 point) It explains battle tactics. It reveals secrets of his faith. gives insight into the world of Islam . describes places in Africa.
The correct answer is: It gives insight into the world of Islam.
Ibn Battuta's book, "A Gift to Those Who Contemplate the Wonders of the Cities and Marvels of Traveling" is significant to historians because it provides valuable insights into the world of Islam during the 14th century. Ibn Battuta was a Muslim scholar and explorer who extensively traveled throughout Africa, the Middle East, India, and Southeast Asia. His writings can shed light on various aspects of Islamic society, including its cultural, religious, and political practices. While his book may mention battle tactics and describe places in Africa, its primary importance lies in offering a broader understanding of the Islamic world during his time.
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Ty!
Multiply Whole Numbers Practice
Complete this assessment to review what you’ve learned. It will not count toward your grade.
1 of 51 of 5 Items
Question
Use the standard algorithm to find the product of 853 and 59. Record the product of multiplying by the ones digit, the product of multiplying by the tens digit, and the final product.(2 points)
The product of multiplying the ones digit of 59 by 853 is
. The product of multiplying the tens digit of 59 by 853 is
. The product is
.
Apologies, but as a text-based AI, I'm unable to view or solve calculations in real-time. However, I can guide you on how to solve this multiplication problem using the standard algorithm.
To find the product of 853 and 59 using the standard algorithm, follow these steps:
1. Write down the numbers vertically, with the larger number on top:
853
× 59
__________
2. Begin by multiplying the ones digit of 853 (3) by 59. Write the result below the line:
853
× 59
__________
477
3. Next, multiply the tens digit of 853 (5) by 59. This time, write the result one place to the left:
853
× 59
__________
477
4265
4. Lastly, multiply the hundreds digit of 853 (8) by 59. Write the result two places to the left:
853
× 59
__________
477
4265
5027
5. Add up the partial products:
853
× 59
__________
477
4265
5027
__________
50227
So, the product of 853 and 59 is 50,227.
Please let me know if there's anything else I can help you with!
Multiply Whole Numbers Practice
Complete this assessment to review what you’ve learned. It will not count toward your grade.
1 of 51 of 5 Items
Question
Use the standard algorithm to find the product of 853 and 59. Record the product of multiplying by the ones digit, the product of multiplying by the tens digit, and the final product.(2 points)
The product of multiplying the ones digit of 59 by 853 is blank
. The product of multiplying the tens digit of 59 by 853 is blank
. The product is blank
.
Apologies, but as a text-based AI, I'm unable to view or solve calculations in real-time. However, I can guide you on how to solve this multiplication problem using the standard algorithm.
To find the product of 853 and 59 using the standard algorithm, follow these steps:
1. Multiply the ones digit of 59 (9) by 853:
9 * 853 = 7677
The product of multiplying the ones digit of 59 by 853 is 7677.
2. Multiply the tens digit of 59 (5) by 853:
5 * 853 = 4265
The product of multiplying the tens digit of 59 by 853 is 4265.
3. Multiply the entire number 853 by 59 using the standard algorithm:
853
× 59
______________
853 (this row represents 853 multiplied by the ones digit of 59)
+ 4265 (this row represents 853 multiplied by the tens digit of 59)
______________
50227
The final product is 50227.
Therefore:
The product of multiplying the ones digit of 59 by 853 is 7677.
The product of multiplying the tens digit of 59 by 853 is 4265.
The product is 50227.
I hope this helps! Let me know if you have any further questions.
Explain how you can use a straightedge and a compass to construct an angle that is both congruent and adjacent to a given angle.
To construct an angle that is both congruent and adjacent to a given angle, you can use a straightedge and a compass. Here are the steps to follow:
1. Start by drawing the given angle on a piece of paper or a drawing surface.
2. Place the point of the compass on the vertex of the given angle and draw an arc that intersects both sides of the angle.
3. Without changing the compass width, move the point of the compass to one of the intersection points on the angle. Draw another arc that intersects the first arc and extends beyond the given angle.
4. Use a straightedge to draw a line connecting the vertex of the given angle to the intersection point of the two arcs. This line will be congruent to the given angle and adjacent to it.
By following these steps, you will be able to construct an angle that is both congruent and adjacent to the given angle using a straightedge and a compass.
Please let me know if you have any further questions or need clarification on any step!