4. Biodiversity Flashcards
BIODIVERSITY
Biodiversity is simply the general term used to describe the variety of living organisms and ecosystems on Earth
One way you can measure biodiversity is by calculating the species Index of diversity (d)
To do this you need:
- The number of different species there are (species richness)
- And the abundance of each species (the number of individuals in each species)
…….within a community
The higher the Species diversity of plants, the higher the species diversity of animals because
- There are more habitats for the animals to make homes in
- And a greater variety of food sources – animals don’t just rely on 1 type of plant as food
- Farming practises and human activity such as deforestation can dramatically reduce biodiversity
How to calculate the Index of diversityu for a community
d = 3.44 (3sf)
(b) Calculate the index of diversity of this sample. Show your working.
Use the following formula to calculate the index of diversity.
2.68(6)
(c) Suggest how this student would obtain data to give a more precise value for the index of diversity of this habitat.
- Take more samples and find mean;
2.Method for randomised samples described;
Allow larger area = 1 mark
Farmers clear tropical forest and grow crops instead. Explain how this causes the diversity of insects in the area to decrease
- Lower diversity of plants/few species of plants/less variety of plants/few plant layers;
- Few sources/types of food/feeding sites;
- Few habitats/niches;
- Fewer (species of) herbivore so few (species of) carnivores;
- Aspect of agriculture (killing insects);
Must be a reference to species or kinds, not just fewer insects and fewer plants.
Not less food.
Application
Null hypothesis: There is no correlation between the number of crop types and the index of diversity.
Rs = 0.976 (3 s.f.)
Type of correlation = positive
Strength of correlation = fairly strong
Critical value of Rs= 0.738
Reject the null hypothesis our calculated value of Rs (0.976) is higher than the critical value (0.738)
There is a less than 5% probability that the correlation is due to chance.
The correlation is significant.
