2-Standard celeration chart and applications Flashcards Preview

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1
Q

Inductive versus deductive

Intimate CONTACT with phenomenon of interest such as:
Biology
Chemistry
Physics

Focus:
Observable behavior
objective, operational definitions

Involves use of:
standard, absolute units of measurement
Experimental analysis
Identification of functional relations

A

Natural Science of Behavior

2
Q

Standard Units
Everyone uses them

Absolute Units
VALUE does NOT change from one instance to the next

Universal Units
Apply to every instance

Dimensional QUANTITY of behavior:
Entailed in the behavior itself
Not an abstraction
Sensitive to changes in the independent variable
Visible to the naked eye!
A

Units of Measurement- Natural science of behavior

3
Q

Count
-Repeatability Or Countability

Time

- Behavior occurs in time
- Behavior takes time to occur
A

Properties of Behavior

4
Q

Derived from the fundamental properties of behavior:

- Frequency/rate (count/time)     - Latency (temporal locus)    - Duration (temporal extent)     - Celeration (count/time/time)     - Inter-response Time
A

Dimensional Quantities of Behavior

5
Q

Abstractions from behavior of interest

Statistics-
Percent correct, ratios, Likert Scales

Insensitive to environmental variables

A

Dimensionless Quantities

6
Q

Utilized Natural science of behavior

Focused on:

Free -operant responding (Operant chamber)
Rate of response as a measure of behavior
Standard graphic display (Cumulative record)

Because of these things, was able to make the DISCOVERIES he did.

A

B.F. Skinner

7
Q

Can be emitted any time

Discrete

Do not require much time for completion

Produce a wide range of response rates
Ex. Key pecks and lever presses

A

Free operant responses

8
Q

Dimensional unit of behavior that is defined as count/Time

Sensitive to settle manipulations of the independent variable
  Such as: 
schedules of reinforcement
Stimulus control Procedures
Extinction
A

Rate of response

9
Q

A standard graphic display that reflects a ratio of count over time

Provides an ongoing, continuous recording.

Standard slopes are produced that are represented as frequency/rate of responding, thus allowing ease of interpretation and comparison

A

Cumulative record

10
Q

A student of BF Skinner

Commitment was to put the same analytic tools into the hands of teachers/practitioners, such that discoveries could be made

To this end, created the Standard Celeration Chart, SCC

A

Og Lindsley

11
Q

Lowest point is at .001 (1000 minutes). This represents one Occurrence of behavior in a single DAY.

Highest point is at 1000 and a depicts a behavior occurring 1000 times per minute

Celeration is change in rate over time.
Count/minute/day/week

Bottom axis = successive calendar days with THIN Vertical lines = Individual weekdays

Top axis = successive calendar week With Sunday = thick vertical lines.

Column between two Sunday lines is one calendar week.

Bottom left Is a standard Celeration fan-Depicts standard slopes and allows you to compare and achieved slope with the standard slope.

On right = a cheat sheet of time periods of chart.

A

Standard Celeration Chart

12
Q

1) Counting Time Floor : Observation, recording period
- Formula: 1/number of minutes spent recording.
2) Frequency Correct

3)Frequency Incorrect
Find where Day Line and Frequency Line Intersect
 Chart at Intersection

Apply is mainly to acquisition targets. Ex,. Number of words read correctly and monitor words read incorrectly.

Deceleration Target, may not have fair pair

A

Creating a complete daily record:

13
Q

Dropping timing. Reflects longer and longer Timing. And is treated with a dash on the line that intersects at the day and the frequency line for your timing floor

A

Standard celebration chart

14
Q

Using a standard absolute unit of measurement: Count per minute.

Even if we are recording longer it still count per minute

A

Standard celebration chart: charting frequencies

15
Q

Change in RATE over time

Ex. Count/ minute/day/week

A

Celeration

16
Q

Human behavior changes EXPONENTIALLY. Via Multiplication and Division

Y axis Allows us to predict human behavior more accurately because logarithmic nature of SCC Provides better representation of human behavior and changes in behavior than can be captured on traditional equal intervals line graph

Different than equal interval line graphs, which move up and down y-axis via addition and subtraction (by factor 1).

Left vertical axis different than most traditional graphs. One Moves up the access via MULTIPLICATION and Down via division. = logarithmic nature of chart

Bottom left standard Celeration Fan; Depicts standard slopes and allows comparison of achieved slope with standard

Right: cheat sheet of time Periods for chart

A

Standard celebration chart- first member of family of charts

17
Q

Enables looking at Weekly Changes

Along bottom- Successive Calendar weeks
- Thin vertical lines represents a single week

Top- Calendar Months. Each Column = month

A

Weekly Chart- second member of family of charts SCC

18
Q

Bottom- Success of calendar months

Top- Years

Thin line- Single Month

Bold Lines: Years

A

Monthly Chart- Third member family SCC

19
Q

Across Bottom = Successive calendar months

Across Top= Decades

A

Yearly chart- last (4th) member SCC

20
Q

Axis

Slopes

Unit of measure

A

Standard on the SCC

21
Q

Standard Behavior Chart

6 Cycle Chart- has Six COUNTING CYCLES of 10

A

Other names used for the SCC

22
Q

The slope of a celebration line at a given value (Eg x2 celeration) will be the same regardless of where the baseline behavior occurred. That is, proportional amount of behavior change are preserved regardless of starting frequency

A

The relationship between starting frequency and equivalent slopes

23
Q

Frequency lines on the chart are not counted by the same interval all the way up the chart.

County starts with ones, 123…But at 10 the counting interval changes to 10 i.e., 10, 20, 30.

It again changes at 100.

The jingle describes how to count up the Y –axis:

The B___. Number on the left, that starts with one, tells you what to count B____. And we are to count F____.

A

Counting along the Y axis

24
Q

depicts standard slopes

Allows for quick comparison

A

Standard celeration fan

25
Q

The slope of a celebration line at a given value e.g., X 2 Celeration , will be the same regardless of where the baseline behavior occurred.

That is, proportional amount of behavior change our preserved regardless of starting frequency.

A

Relationship between starting frequency and equivalent Slopes

26
Q

Equal interval graphs do not use a standard data display, unit of time or measurement

problematic because you must always orient your audience and yourself to each unique graph.

Slopes are inflated as you MOVE up the scale.

Baseline frequencies are a Letter CONFOUND Which makes it difficult to analyze the intervention

A

Problems with equal intervals line graph

27
Q

Calibration on the SCC involves setting a common START date across all charts you use

Three essential pieces of information for completing a daily record are there;
1. Counting time floor: The time spent actually recording. Calculated by dividing one by the total minutes spent recording. It is charted with a dash to horizontal line.
For timing. Less than a minute that counting time floor is calculated in one of two ways. First is to divide one by a fraction of a minute. The second option is to divide 60 by the number of seconds

  1. Frequency correct
  2. Frequency incorrect.

To track frequency, find where the day line and the frequency line intersect and chart at the intersection

A

Basic charting conventions on the SCC

28
Q

1) Counting Time Floor
2) Frequency Correct
3) Frequency Incorrect

To chart frequency,
Find where Day Line and Frequency Line Intersect
Chart at Intersection

For timing. Less than a minute the counting time floor is calculated one of two ways.

1. divide one by a fraction of a minute
2. Divide 60 by the number of seconds
A

Creating a complete daily record: Three Pieces of information

29
Q

Time spent actually recording

Calculated by dividing one by the total minutes spent recording

Always plotted with a dashed horizontal line

A

Counting time Floor – SCC

30
Q

Dividing the count by the number of minutes spent recording
OR
Multiplying count by counting time FLOOR.

Charting frequencies for timings greater than one minute: count / Number of minutes spent recording
OR
Multiplying the count by the counting time floor
Count x Counting Time Floor

For timings Less than one minute the frequency is charted by dividing the count by the fraction of a minute or multiplying count by the Counting time floor
Count/Fraction of a minute
Or
Count x Counting Time Floor

The standard unit of measurement on the SCC is count per minute

A

Charting frequencies

31
Q

Zero does not appear on the SCC because zero does not exist in the multiple world.

That is, anything multiplied by zero is zero. To chart a frequency of zero a data point, “X” or “?” Place just below the counting time floor

A

Charting frequencies

32
Q

Behavior has an opportunity to occur but is not observed or recorded.

When charting across these days, Connect data points between one observation and the next.

A

Ignore days

33
Q

The behavior does not have the opportunity to occur

Data points are not connected across these days

A

No chance days

34
Q

Phase change lines are charted the same as on other type graphs:
•Vertical line is added between changes and data points are not connected across phase change lines.

CELERATION lines are also not drawn across phase change lines

A

Phase change lines

35
Q

Designed in seven days to make a chart to fit the full range of behavior on one single device

Many people think it looks odd and do not accept it

Used by many precision teaching professionals

Can use with full range of human behavior

Scale goes from 1000 per minute to one per day

Slope equals change in frequency or celebration

A

Celeration Chart

36
Q
  • Scale on the left is the number/count per minute, beginning with zero at the bottom and rising to 1000 on the daily chart. This scale is a multiply/divide logarithmic) Scale.
  • instead of being divided evenly, this scale is continuously divided. Since the spaces between the numbers are getting smaller we can’t by 1’s To the 10 Mark, then by 10’s to the 100 Mark, and by 100’s above that.
A

Celeration chart

37
Q

The scale across the bottom:

Is an even scale (add-Subtract), and represents a Calendar Days.

Each THIICK vertical line on this bottom scale represents a Sunday.

Line to four Monday through Saturday or the thinner vertical lines. Each chart spends 20 weeks or 140 days

  • Distances between points and slopes remain the same always ( Standard, horizontal and vertical scales remain the same)
  • Not equal interval chart or add/subtract; it is an equal ratio scale
    • Multiply going up or divide going down equal distances
  • Time range of one second to 24 hour
  • Standard display of frequency, duration, celebration, latency, I RT, and variability (bounce)
  • Data points and slopes for these measurements on a specific date will always be in the same spot on a Celeration chart
A

Standard celeration chart

38
Q

the lowest possible, non zero measure

1/amount of time Counting Behavior

A

Record Floor

39
Q

the number of minutes spent observing.

1/#Of observation minutes

A

RECORD CEILING

40
Q

To draw counting time floor (Observation time/record floor) Either use duration info on right, or divide one by the number of minutes

1/30 equals .03

A

Plotting data on a standard celebration chart

41
Q

Where would you put a frequency of zero on the SCC?

Just above the record floor

Just below the record floor

A

Just below the record floor

41
Q

The same as charting counting time floor, but using a (Forward slash. / ) to denote

/Is moving down the chart indicates longer latencies to respond.

/Is moving up at the chart indicate shorter latencies to respond

A

Charting LATENCY

43
Q

1) Determine the slope and direction of the trend line
2) Using a straight edge and draw a line of best fit through the data serious
3. Ensure equal number of data points intercepting, above or below Celeration line.

A

Estimating Celeration

44
Q

The number of minutes the behavior can possibly occur.

Charted by dividing one by the number of minutes the behavior could actually occur:

1/Number of minutes behavior could occur

IGNORED Minutes occur between the counting time floor and the behavior floor

A

Behavior floor

45
Q

The number of minutes spent observing.

Charted by dividing one by the number of OBSERVATION Minutes.:
1/Number of observation minutes

A

Record Ceiling

46
Q

Is the same as charting the counting time floor, but use a Forward slash to denote on The chart

Forward slash / is moving down the chart indicates longer latencies to respond.

/ moving up the chart indicate shorter latencies to respond

A

Charting latency

47
Q

The amount of time it takes for a behavior to occur.

Charting on the SCC is the same as charting the counting time a floor, but use a backward/to do note on the chart

Backward/is moving down the chart indicate the behavior is occurring for longer periods of time.

Backward/is moving off the chart indicate the behavior is occurring faster (Shorter duration of time)

A

Charting duration

48
Q

The most critical feature Of the chart

An index of Learning

Used because behavior changes exponentially (via Multiplication and division)

A

Celeration

49
Q
  1. Determine the slope and direction of the trend line
  2. Use a straight edge to draw a line of best FIT through the data series.
  3. Ensure they are an equal number of data points intersecting, falling above, and/or falling below the Celeration line
A

Estimating Celeration

50
Q

Draw a line parallel to the CELERATION line and passing through a one online and a Sunday line

If the Celeration is decreasing, read frequency at the Previous Sunday line

Slopes of x2 or greater are known to result in clinically significant results

A

Finding Celeration Values

51
Q

A system of measuring and analyzing behavior using Standard chart

Founded by Og Lindsley

Put our scientific Tools In the hands of teachers and practitioners.

By adhering to this measurement system discovery is made possible.

A

Precision teaching

52
Q

Component/Composite relations
 Operant classes
 Functional relations

Functional mastery criteria
 Fluency
 Aims
 RESAA

A

Discoveries made through precision teaching

53
Q

A term introduced by Carl Binder

word to describe mastery and means accuracy plus speed ( Otherwise known as an Automaticity and second nature)

The rate = response probability

Selectionist Account.

Product of practice

A

Fluency

54
Q

Retention (maintenance, memory)

Endurance (resistance to distractions/fatigue)

Stability (low variability)

Application (easily learn next step,
generalization)

Adduction (emergence of new repertoires)

A

RESAA

55
Q

ASR #18
Who was the founder of Precision Teaching?
a. B.F. Skinner b. E.L. Thorndike c. Og Lindsley
d. None of these

A

C

56
Q

Seemingly polar notions

One informs the other

Bi-directional relationship

Measurement!

A

Precision and Scope

57
Q

Standard, absolute, universal

Properties of behavior (count and
time)

Dimensional units

Standard visual display enables ease of interpretation

Ease of comparison across behaviors, settings, individuals:
Scientist-Practitioner, Growth or decay of operants, Emergence of operant classes, On-going functional analyses and, Assessment, becomes synonymous with intervention

Celerations produce standard slopes
Straight trend lines yield prediction
Add scales produce curvilinear lines – prediction not possible

Times 2 or greater celeration
Clinically significant
Statistically significant

Broad scale impact
Precision yields scope
Data display versus data analysis

A

Benefits to Standard Charting

58
Q

Human behavior changes………

A

Exponentially

59
Q

Everyone uses them (units of measurement)

A

Standard Units if time

60
Q

VALUE does NOT change from one instance to the next

A

Absolute Units

61
Q

Unit of Measurement that Applies to every instance

A

Universal Units

62
Q

In a standard celebration chart, and increase in duration is indicated by a path that:

Moves Up at the Y axis

Moves down the Y axis

A

B

62
Q

For timing greater than one minute:

count/number of minutes spent
recording
OR
Count x Counting Time Floor

Zero Does not appear on the SEC because it does not exist in the multiple world.
(Anything multiplied by zero is zero).
To chart a frequency of zero a data point (dot), x Or ? This place just below the counting time floor

A

Charting frequencies

63
Q

Does not appear on the SEC because it does not exist in the multiple world.
(Anything multiplied by zero is zero)

A

Zero

64
Q

Seemingly Polar notion’s but one INFORMS the other

A bidirectional relationship.

Measurement!

A

Precision and scope

65
Q

Slope equals…

A

Change in frequency or Celeration

66
Q

The amount of time it takes for a behavior to occur.

Charting this is the same as charting the counting time floor ( record floor):
but use a Backward slash \

Backward \ moving down the shore indicate the behavior is occurring for longer periods of time.

Backward \ moving up the chart indicate the behavior is occurring faster (shorter duration of time)

A

Charting duration