A monkey climbed 3×3/5 m up a coconut tree of height 10m.It rested for a while and continued to climb another 4×2/3 m up the tree.how many more metres must the monkey climb so as to reach the top of the tree?
You are clearly not following directions and suggestions.
https://www.jiskha.com/questions/1783462/Alice-used-3-4-of-paint-to-colour-her-drawing-belinda-used-4-5-more-than-alice-to
I still see the same notation of 3×3/5 instead of 3 3/5, and again you attached
a new question to a previous post
3 3/5 + 4 2/3 = 3 9/15 + 4 10/15 = 8 4/15
so, subtract that from 10, and that's how far yet to go, right?
Ann bought 5/8kg of tomatoes to make a salad dish.2/5of the tomatoes were rotten and the rest were fresh .what was the mass of fress tomatoes ?
To find out how many more meters the monkey must climb to reach the top of the tree, we need to calculate the total distance it has already climbed and then subtract it from the height of the tree.
First, let's calculate the distance the monkey climbed in the first part:
Height climbed in the first part = 3 × 3/5 m
= 9/5 m
Next, let's calculate the distance the monkey climbed in the second part:
Height climbed in the second part = 4 × 2/3 m
= 8/3 m
To find the total distance climbed, we add the distances from both parts:
Total distance climbed = Height climbed in the first part + Height climbed in the second part
= 9/5 m + 8/3 m
To add these fractions, we need to find a common denominator:
Denominator of 5 and 3 is 15. So, we convert the fractions:
Total distance climbed = (9/5) * (3/3) m + (8/3) * (5/5) m
= 27/15 m + 40/15 m
= 67/15 m
Now, we can find the remaining distance the monkey needs to climb to reach the top of the tree:
Remaining distance = Height of the tree - Total distance climbed
= 10 m - (67/15) m
To subtract these fractions, we need to find a common denominator:
Denominator of 15 and 1 is 15. So, we convert the fractions:
Remaining distance = (10/1) * (15/15) m - (67/15) m
= 150/15 m - 67/15 m
= 83/15 m
Therefore, the monkey needs to climb an additional 83/15 meters to reach the top of the tree.