AD9949KCP Analog Devices Inc, AD9949KCP Datasheet - Page 20
AD9949KCP
Manufacturer Part Number
AD9949KCP
Description
IC CCD SIGNAL PROCESSOR 40-LFCSP
Manufacturer
Analog Devices Inc
Type
CCD Signal Processor, 12-Bitr
Datasheet
1.AD9949AKCPZ.pdf
(36 pages)
Specifications of AD9949KCP
Rohs Status
RoHS non-compliant
Input Type
Logic
Output Type
Logic
Interface
3-Wire Serial
Mounting Type
Surface Mount
Package / Case
40-LFCSP
Analog Front End Type
CCD
Analog Front End Category
Video
Interface Type
Serial (3-Wire)
Sample Rate
36MSPS
Input Voltage Range
0.5V
Operating Supply Voltage (min)
2.7V
Operating Supply Voltage (typ)
3V
Operating Supply Voltage (max)
3.6V
Resolution
12b
Number Of Adc's
1
Power Supply Type
Analog/Digital
Operating Temp Range
-20C to 85C
Operating Temperature Classification
Commercial
Mounting
Surface Mount
Pin Count
40
Package Type
LFCSP EP
Number Of Channels
1
Current - Supply
-
Lead Free Status / RoHS Status
Not Compliant
Available stocks
Company
Part Number
Manufacturer
Quantity
Price
Company:
Part Number:
AD9949KCP
Manufacturer:
AD
Quantity:
1 831
Company:
Part Number:
AD9949KCP
Manufacturer:
ADI
Quantity:
455
Company:
Part Number:
AD9949KCPZ
Manufacturer:
TI
Quantity:
6 528
Part Number:
AD9949KCPZ
Manufacturer:
ADI/亚德诺
Quantity:
20 000
Company:
Part Number:
AD9949KCPZRL
Manufacturer:
PERICOM
Quantity:
3
AD9949
(INTERNAL)
CCDIN
DOUT
SHD
CLI
1 PIXEL PERIOD
NOTES
1. DEFAULT TIMING VALUES ARE SHOWN: SHDLOC = 0, DOUT PHASE = 0.
2. HIGHER VALUES OF SHD AND/OR DOUTPHASE WILL SHIFT DOUT TRANSITION TO THE RIGHT, WITH RESPECT TO CLI LOCATION.
N – 1
N – 13
t
CLIDLY
DOUT
CLI
N
N – 12
NOTES
1. DIGITAL OUTPUT DATA (DOUT) PHASE IS ADJUSTABLE WITH RESPECT TO THE PIXEL PERIOD.
2. WITHIN ONE CLOCK PERIOD, THE DATA TRANSITION CAN BE PROGRAMMED TO ANY OF THE 48 LOCATIONS.
P[0]
SAMPLE PIXEL N
N + 1
N – 11
t
OD
N + 2
N – 10
N + 3
Figure 20. Pipeline Delay for Digital Data Output
N – 9
P[12]
Figure 19. Digital Output Phase Adjustment
N + 4
N – 8
PIPELINE LATENCY = 11 CYCLES
Rev. B | Page 20 of 36
N + 5
N – 7
N + 6
P[24]
N – 6
N + 7
N – 5
N + 8
N – 4
P[36]
N + 9
N – 3
N + 10
N – 2
N + 11
N – 1
P[48] = P[0]
N + 12
N
N + 13
N + 1