Back to Topic 4.16 — Confidence intervals (HL only)
4.16.1Math AI HL8 flashcards

Confidence intervals for a mean

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Card 1 of 84.16.1
4.16.1
Question

What is a confidence interval for a mean?

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All 8 Flashcards — Confidence intervals for a mean

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Card 1concept

Question

What is a confidence interval for a mean?

Answer

A range of believable values for the true population mean, built as x̄ ± margin of error. A 95% interval is produced by a method that captures the true mean about 95% of the time.

Card 2formula

Question

Write the formula for a confidence interval for a mean.

Answer

x̄ ± t*·s_{n-1}/√n, where t* comes from the t-distribution with df = n − 1.

Card 3formula

Question

How many degrees of freedom does a CI for a single mean use?

Answer

df = n − 1 (one less than the sample size). The GDC's t-interval applies this automatically.

Card 4concept

Question

Which standard deviation goes in the CI formula, and why?

Answer

The unbiased estimate s_{n-1} (the GDC's 'Sx', dividing by n − 1), because the true population σ is unknown and must be estimated from the sample.

Card 5concept

Question

On a GDC, how do you build a CI for a mean?

Answer

Use the t-interval menu: enter x̄, s_{n-1} and n (or the raw data) and the confidence level (C-Level), then read off the interval (a, b).

Card 6concept

Question

How does increasing the sample size affect the interval?

Answer

It makes the interval NARROWER: a larger n increases √n in the denominator, so the margin t*·s/√n shrinks — a more precise estimate.

Card 7concept

Question

How does raising the confidence level affect the interval?

Answer

It makes the interval WIDER: a higher confidence level uses a larger t*, so the margin grows — you cast a wider net to be more sure of trapping μ.

Card 8concept

Question

How do you use a CI to test a claimed value of the mean?

Answer

If the claimed value lies INSIDE the interval it is plausible (consistent with the data); if it lies OUTSIDE, the data give evidence against the claim.

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