- The beans are positioned at a 133° angle from the rice.
- The cassava is positioned at a 60° angle from the bananas.
To analyze the situation, let's consider the given angles between different food items in the supermarket:
1. **Beans and Rice (180°):** The beans and rice together form a straight line, so their angles add up to 180°. Given that the rice is at a 47° turn from the beans, we can set up an equation:
\[ \text{Angle between beans and rice} + \text{Angle between rice and beans} = 180° \]
\[ \text{Angle between beans and rice} + 47° = 180° \]
Solving for the angle between beans and rice:
\[ \text{Angle between beans and rice} = 180° - 47° = 133° \]
Therefore, the beans are positioned at a 133° angle from the rice.
2. **Cassava and Bananas (Linear Pair):** A linear pair forms a straight line, and the angle between cassava and bananas is given as 120°. In a linear pair, the angles add up to 180°. Therefore, the angle between cassava and bananas is:
\[ \text{Angle between cassava and bananas} = 180° - 120° = 60° \]
Hence, the cassava is positioned at a 60° angle from the bananas.
The probable question may be:
Analyze the following situation as a team.
In a supermarket, various food items are placed in different positions; the rice is at a 47° turn from the beans, the eggs at 35° from the bread and the bananas at 120° from the cassava.
If the beans and rice together form a 180° angle, what is the exact position of the beans?
And in the case of cassava, assuming that both items form a linear pair?