Biology
Grade-10
Easy
Question
Which of the following is the cellular respiration equation?
- 6CO2 + 6H2O + Energy → C6H12O6
- 6CO2 + 6H2O → C6H12O6 + Energy
- C6H12O6 + 6O2 → 6CO2 + 6H2O + Energy
- C6H12O6 + 6O2 → 6CO2 + Energy
Hint:
Cellular respiration can be described as a reaction between glucose and oxygen to produce carbon dioxide and water along with the release of energy which is useful for cellular activities.
It can be expressed as:
![Glucose space plus space oxygen space rightwards arrow space Carbon space dioxide space plus space water space plus space energy](data:image/png;base64,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)
The correct answer is: C6H12O6 + 6O2 → 6CO2 + 6H2O + Energy
The chemical equation for cellular respiration is given below:
![straight C subscript 6 straight H subscript 12 straight O subscript 6 space plus space 6 straight O subscript 2 space rightwards arrow space 6 CO subscript 2 space plus space 6 straight H subscript 2 straight O space plus space energy](data:image/png;base64,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)
The above reaction is formulated with the help of three processes- Glycolysis, Krebs cycle, and the electron transport chain.
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Biology
Match the following:
![](data:image/png;base64,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)
Match the following:
![](data:image/png;base64,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)
BiologyGrade-10
Biology
The first step of Calvin pathway includes which of the following?
The first step of Calvin pathway includes which of the following?
BiologyGrade-10
Biology
Select the correct statement regarding carbon dioxide fixation?
Select the correct statement regarding carbon dioxide fixation?
BiologyGrade-10