# 555 [www.fairchildsemi.com](www.fairchildsemi.com) The LM555/NE555/SA555 is a highly stable controller capable of producing accurate timing pulses. With a monostable operation, the time delay is controlled by one external resistor and one capacitor. With an astable operation, the frequency and duty cycle are accurately controlled by two external resistors and one capacitor. ## Features - High Current Drive Capability (200mA) - Adjustable Duty Cycle - Temperature Stability of 0.005%/°C - Timing From μSec to Hours - Turn off Time Less Than 2μSec ## Applications - Precision Timing - Pulse Generation - Time Delay Generation - Sequential Timing ## Internal Block Diagram ```mermaid flowchart TB subgraph IC["555 Timer IC"] direction TB subgraph DIVIDER["Voltage Divider"] R1["R (5kΩ)"] R2["R (5kΩ)"] R3["R (5kΩ)"] R1 --- R2 --- R3 end COMP1["Comparator 1
(Threshold)"] COMP2["Comparator 2
(Trigger)"] FF["Flip-Flop
S-R"] OUT_STAGE["Output
Stage"] DISCH_TR["Discharge
Transistor"] VREF["Vref"] end PIN8["Pin 8
Vcc"] --> R1 R3 --> PIN1["Pin 1
GND"] R1 -.->|"2/3 Vcc"| COMP1 R2 -.->|"1/3 Vcc"| COMP2 PIN6["Pin 6
Threshold"] --> COMP1 PIN2["Pin 2
Trigger"] --> COMP2 COMP1 -->|R| FF COMP2 -->|S| FF FF --> OUT_STAGE FF --> DISCH_TR OUT_STAGE --> PIN3["Pin 3
Output"] DISCH_TR --> PIN7["Pin 7
Discharge"] PIN4["Pin 4
Reset"] --> FF PIN5["Pin 5
Control Voltage"] -.-> R2 style PIN1 fill:#000,color:#fff style PIN2 fill:#f96,color:#000 style PIN3 fill:#6f6,color:#000 style PIN4 fill:#f66,color:#000 style PIN5 fill:#ff6,color:#000 style PIN6 fill:#6ff,color:#000 style PIN7 fill:#f6f,color:#000 style PIN8 fill:#f00,color:#fff ``` **Pin Configuration:** | Pin | Name | Function | |:---:|:---|:---| | 1 | GND | Ground reference | | 2 | TRIG | Trigger input (< 1/3 Vcc starts timing) | | 3 | OUT | Output (high or low) | | 4 | RESET | Active low reset | | 5 | CONT | Control voltage (2/3 Vcc reference) | | 6 | THRES | Threshold input (> 2/3 Vcc ends timing) | | 7 | DISCH | Discharge (open collector) | | 8 | Vcc | Supply voltage (+4.5V to +16V) | ## Absolute Maximum Ratings (Ta = 25°C) | Parameter | Symbol | Value | Unit | | :--- | :--- | :--- | :--- | | Supply Voltage | Vcc | 16 | V | | Lead temperature (soldering 10 sec) | Tled | 300 | °C | | Power Dissipation | PD | 600 | mW | | Operating Temperature Range
LM555/NE555
SA555 | Topr | - 65 ~ + 150 | °C | ## Electrical Characteristics (TA = 250C, vcc = 5 15V, unless otherwise specified) | Parameter | Symbol | Conditions | Min. | Typ. | Max. | Unit | | :--- | :--- | :--- | :--- |:--- | :--- | :--- | | Supply Voltage | vcc | - | 4.5 | - | 16 | V | | Supply Current (Low Stable) (Note 1) | Icc | Vcc = 5V, Rl = ∞

Vcc = 15V, Rl = ∞ | -

- | 3

7.5 | 6

15 | mA

mA | | Timing Error (Monostable)
Initial Accuracy (Note2)
Drift with Temperature (Note4)
Drift with Supply Voltage (Note4)
| ACCUR
Δt/ΔT
Δt/ΔVcc | Ra = 1kΩ to100kΩ
C = 0.1μF | - | 1.0
50
0.1 | 3.0

0.5 | %
ppm/°C
%/V | | Timing Error (Astable)
Initial Accuracy (Note2)
Drift with Temperature (Note4)
Drift with Supply Voltage (Note4) | ACCUR
Δt/ΔT
Δt/ΔVcc | Ra = 1kΩ to 100kΩ
C = 0.1μF | - | 2.25
150
0.3 | - | %
ppm/°C
%/V | | Control Voltage | Vc | Vcc = 15V

Vcc = 5V | 9.0

2.6 | 10.0

3.33 | 11.0

4.0 | V

V | | Threshold Voltage | VTH | VCC = 15V

VCC = 5V | -

- | 10.0

3.33 | -

- | V

V | | Threshold Current (Note3) | Ith | - | - | 0.1 | 0.25 | μA | | Trigger Voltage | VTR | VCC = 5V

VCC = 15V | 1.1

4.5 | 1.67

5 | 2.2

5.6 | V

V | | Trigger Current | ITR | VTR = 0V | 0.01 | 2.0 | μA | | Reset Voltage | VRST | - | 0.4 | 0.7 | 1.0 | V | | Reset Current | IRST | - | 0.1 | 0.4 | mA | | Low Output Voltage | VOL | VCC = 15V
ISINK = 10mA
ISINK = 50mA

VCC = 5V
ISINK = 5mA | -

- | 0.06
0.3

0.05 | 0.25
0.75

0.35 | V
V

V | | High Output Voltage | VOH | VCC = 15V
ISOURCE = 200mA
ISOURCE = 100mA

VCC = 5V
ISOURCE = 100mA | 12.75

2.75 | 12.5
13.3

3.3 | -

- | V
V

V | | Rise Time of Output (Note4) | tR | - | - | 100 | - | ns | | Fall Time of Output (Note4) | tF | - | - | 100 | - | ns | | Discharge Leakage Current | ILKG | - | - | 20 | 100 | nA | **Notes:** 1. When the output is high. the supply current is typically 1mA less than at VCC = 5V. 2. Tested at VCC = 5.0V and VCC = 15V. 3. This will determine the maximum value of RA + RB for 15V operation, the max- total R = 20MQ. and for 5V operation, the max/ - total R 8.7MΩ 4. These parameters, although guaranteed. are not 100% tested in production. ## Application Information Table 1 below is the basic operating table of 555 timer: | Threshold Voltage
(Vth)(PIN 6) | Trigger Voltage
(Vtr)(PIN 2) | Reset(PIN 4) | Output(PIN 3) | Discharging Tr.
(PIN 7) | | :--- | :--- | :--- | :--- | :--- | | Don't care | Don't care | Low | Low | ON | | Vth > 2Vcc / 3 | Vth > 2Vcc / 3 | High | Low | ON | | Vcc / 3 < Vth < 2 Vcc / 3 | Vcc / 3 < Vth < 2 Vcc / 3 | High | - | - | | Vth < Vcc / 3 | Vth < Vcc / 3 | High | High | OFF | When the low signal input is applied to the reset terminal, the timer output remains low regardless of the threshold voltage or the trigger voltage. Only when the high signal is applied to the reset terminal, the timer's output changes according to threshold voltage and trigger voltage. When the threshold voltage exceeds 2/3 of the supply voltage while the timer output is high, the timer's internal discharge Tr. turns on, lowering the threshold voltage to below 1/3 of the supply voltage. During this time, the timer output is maintained low. Later, if a low signal is applied to the trigger voltage so that it becomes 1/3 of the supply voltage, the timer's internal discharge Tr. turns off, increasing the threshold voltage and driving the timer output again at high. ### 1. Monostable Operation #### Figure 1. Monostable Circuit ```mermaid flowchart LR subgraph CIRCUIT["Monostable Configuration"] VCC["+Vcc"] subgraph TIMER["555 Timer"] P4["4
RESET"] P8["8
Vcc"] P7["7
DISCH"] P2["2
TRIG"] P6["6
THRES"] P3["3
OUT"] P5["5
CONT"] P1["1
GND"] end RA["RA"] C1["C1"] C2["C2
0.01μF"] RL["RL"] GND["GND"] end VCC --> P4 VCC --> P8 VCC --> RA RA --> P7 P7 --> P6 P6 --> C1 C1 --> GND TRIG_IN["Trigger
Input"] --> P2 P3 --> RL RL --> OUTPUT["Output"] P5 --> C2 C2 --> GND P1 --> GND style VCC fill:#f00,color:#fff style GND fill:#000,color:#fff style TRIG_IN fill:#f96 style OUTPUT fill:#6f6 ``` **Component Values:** - RA: Timing resistor (1kΩ to 10MΩ typical) - C1: Timing capacitor - C2: Bypass capacitor (0.01μF recommended) - RL: Load resistor **Time Delay Formula:** $$t_d = 1.1 \times R_A \times C_1$$ #### Figure 2. Resistance and Capacitance vs. Time Delay (td) ```mermaid %%{init: {'theme': 'base', 'themeVariables': { 'primaryColor': '#fff', 'lineColor': '#333'}}}%% xychart-beta title "Time Delay vs Capacitance (Log Scale)" x-axis "Time Delay (seconds)" [0.00001, 0.0001, 0.001, 0.01, 0.1, 1, 10, 100] y-axis "Capacitance (μF)" 0.001 --> 1000 line "R=1kΩ" [0.001, 0.01, 0.1, 1, 10, 100, 1000, 10000] line "R=10kΩ" [0.0001, 0.001, 0.01, 0.1, 1, 10, 100, 1000] line "R=100kΩ" [0.00001, 0.0001, 0.001, 0.01, 0.1, 1, 10, 100] line "R=1MΩ" [0.000001, 0.00001, 0.0001, 0.001, 0.01, 0.1, 1, 10] ``` | RA | C1 | Time Delay (td) | |:---|:---|:---| | 1 kΩ | 0.1 μF | 110 μs | | 10 kΩ | 0.1 μF | 1.1 ms | | 100 kΩ | 0.1 μF | 11 ms | | 1 MΩ | 1 μF | 1.1 s | | 10 MΩ | 10 μF | 110 s | #### Figure 3. Waveforms of Monostable Operation ```mermaid %%{init: {'theme': 'base'}}%% gantt title Monostable Waveforms (Normal Operation) dateFormat X axisFormat %s section Trigger High (Vcc) :a1, 0, 2 Low (RESET"] P8["8
Vcc"] P7["7
DISCH"] P2["2
TRIG"] P6["6
THRES"] P3["3
OUT"] P5["5
CONT"] P1["1
GND"] end RA["RA"] RB["RB"] C1["C1"] C2["C2
0.01μF"] GND["GND"] end VCC --> P4 VCC --> P8 VCC --> RA RA --> P7 P7 --> RB RB --> P6 RB --> P2 P6 --> C1 C1 --> GND P3 --> OUTPUT["Output"] P5 --> C2 C2 --> GND P1 --> GND MOD["Modulation
(optional)"] -.-> P5 style VCC fill:#f00,color:#fff style GND fill:#000,color:#fff style OUTPUT fill:#6f6 style MOD fill:#ff6 ``` **Component Values:** - RA: Charge resistor (controls HIGH time) - RB: Charge/discharge resistor (affects both HIGH and LOW times) - C1: Timing capacitor - C2: Bypass capacitor (0.01μF recommended) **Timing Formulas:** - High time: $t_H = 0.693 \times (R_A + R_B) \times C_1$ - Low time: $t_L = 0.693 \times R_B \times C_1$ - Period: $T = t_H + t_L = 0.693 \times (R_A + 2R_B) \times C_1$ - Frequency: $f = \frac{1.44}{(R_A + 2R_B) \times C_1}$ - Duty Cycle: $D = \frac{R_A + R_B}{R_A + 2R_B}$ #### Figure 6. Capacitance and Resistance vs. Frequency ```mermaid %%{init: {'theme': 'base'}}%% xychart-beta title "Free Running Frequency vs Capacitance" x-axis "Frequency (Hz)" [0.1, 1, 10, 100, 1000, 10000, 100000] y-axis "Capacitance (μF)" 0.001 --> 100 ``` | (RA + 2RB) | C1 | Frequency | |:---|:---|:---| | 1.44 kΩ | 1 μF | 1 kHz | | 14.4 kΩ | 1 μF | 100 Hz | | 144 kΩ | 1 μF | 10 Hz | | 14.4 kΩ | 0.1 μF | 1 kHz | | 14.4 kΩ | 0.01 μF | 10 kHz | #### Figure 7. Waveforms of Astable Operation ``` Output ────┐ ┌─────┐ ┌─────┐ ┌──── (Pin 3) └─────┘ └─────┘ └─────┘ |←tL→|←─tH─→|←tL→|←─tH─→| Threshold /\ /\ /\ (Pin 6) ─────/ \──────/ \──────/ \────── Vcc/3 2Vcc/3 ├────── T ──────┤ T = tH + tL = 0.693(RA + 2RB)C1 Charging: C1 charges through RA + RB Discharging: C1 discharges through RB only ``` **Typical Values:** RA = 1kΩ, RB = 1kΩ, C1 = 1μF, Vcc = 5V An astable timer operation is achieved by adding resistor RB to Figure 1 and configuring as shown on Figure 5. In the astable operation, the trigger terminal and the threshold terminal are connected so that a self-trigger is formed, operating as a multi vibrator. When the timer output is high, its internal discharging Tr. turns off and the VC1 increases by exponential function with the time constant (RA+RB)*C. When the VC1, or the threshold voltage, reaches 2Vcc/3, the comparator output on the trigger terminal becomes high, resetting the F/F and causing the timer output to become low. This in turn turns on the discharging Tr. and the C1 discharges through the discharging channel formed by RB and the discharging Tr. When the VC1 falls below Vcc/3, the comparator output on the trigger terminal becomes high and the timer output becomes high again. The discharging Tr. turns off and the VC1 rises again. In the above process, the section where the timer output is high is the time it takes for the VC1 to rise from Vcc/3 to 2Vcc/3, and the section where the timer output is low is the time it takes for the VC1 to drop from 2Vcc/3 to Vcc/3. When timer output is high, the equivalent circuit for charging capacitor C1 is as follows: #### Equation 1: Charging Circuit Equivalent ```mermaid flowchart LR VCC["Vcc"] --> RA_RB["RA + RB"] RA_RB --> C1["C1
Vc1(0-)=Vcc/3"] C1 --> GND["GND"] ``` **Charging Equation:** $$C_1 \frac{dV_{C1}}{dt} = \frac{V_{CC} - V_{(0-)}}{R_A + R_B} \quad (1)$$ $$V_{C1}(0^+) = \frac{V_{CC}}{3} \quad (2)$$ $$V_{C1}(t) = V_{CC} \left[ 1 - \frac{2}{3} e^{-\frac{t}{(R_A + R_B)C_1}} \right] \quad (3)$$ Since the duration of the timer output high state (tH) is the amount of time it takes for the VC1(t) to reach 2Vcc/3, #### Equation 2: High Time Calculation $$\frac{2}{3}V_{CC} = V_{CC} \left[ 1 - \frac{2}{3} e^{-\frac{t_H}{(R_A + R_B)C_1}} \right] \quad (4)$$ $$t_H = C_1(R_A + R_B) \ln 2 = 0.693(R_A + R_B)C_1 \quad (5)$$ The equivalent circuit for discharging capacitor C1, when timer output is low is, as follows: #### Equation 3: Discharging Circuit Equivalent ```mermaid flowchart LR C1["C1
Vc1(0-)=2Vcc/3"] --> RB["RB"] RB --> RD["RD
(discharge Tr.)"] RD --> GND["GND"] ``` **Discharging Equation:** $$C_1 \frac{dV_{C1}}{dt} + \frac{1}{R_A + R_B} V_{C1} = 0 \quad (6)$$ $$V_{C1}(t) = \frac{2}{3} V_{CC} e^{-\frac{t}{(R_A + R_B)C_1}} \quad (7)$$ Since the duration of the timer output low state (tL) is the amount of time it takes for the VC1(t) to reach Vcc/3, #### Equation 4: Low Time Calculation $$\frac{1}{3}V_{CC} = \frac{2}{3}V_{CC} e^{-\frac{t_L}{(R_B + R_D)C_1}} \quad (8)$$ $$t_L = C_1(R_B + R_D) \ln 2 = 0.693(R_A + R_B)C_1 \quad (9)$$ Since RD is normally RB>>RD although related to the size of discharging Tr., tL=0.693RBC1 (10) Consequently, if the timer operates in astable, the period is the same with 'T=tH+tL=0.693(RA+RB)C1+0.693RBC1=0.693(RA+2RB)C1' because the period is the sum of the charge time and discharge time. And since frequency is the reciprocal of the period, the following applies. #### Equation 5: Frequency Formula $$f = \frac{1}{T} = \frac{1.44}{(R_A + 2R_B)C_1} \quad (11)$$ ### 3. Frequency divider By adjusting the length of the timing cycle, the basic circuit of Figure 1 can be made to operate as a frequency divider. Figure 8. illustrates a divide-by-three circuit that makes use of the fact that retriggering cannot occur during the timing cycle. #### Figure 8. Waveforms of Frequency Divider Operation ``` Trigger ─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─ (Input) └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ 1 2 3 1 2 3 1 2 3 Output ─┐ ┌──┐ ┌──┐ ┌────── (÷3) └────────┘ └────────┘ └────────┘ |← skip →| |← skip →| |← skip →| 2,3 2,3 2,3 Threshold /‾‾‾‾\ /‾‾‾‾\ /‾‾‾‾\ (Vc1) ─────/ \──────/ \──────/ RA = 9.1kΩ, RB = 1kΩ, C1 = 0.01μF, Vcc = 5V ⚙️ Divide-by-N: Set timing so output ignores (N-1) trigger pulses ``` ### 4. Pulse Width Modulation The timer output waveform may be changed by modulating the control voltage applied to the timer's pin 5 and changing the reference of the timer's internal comparators. Figure 9 illustrates the pulse width modulation circuit. When the continuous trigger pulse train is applied in the monostable mode, the timer output width is modulated according to the signal applied to the control terminal. Sine wave as well as other waveforms may be applied as a signal to the control terminal. Figure 10 shows the example of pulse width modulation waveform. #### Figure 9. Circuit for Pulse Width Modulation ```mermaid flowchart LR subgraph CIRCUIT["PWM Configuration"] VCC["+Vcc"] subgraph TIMER["555 Timer"] P4["4
RESET"] P8["8
Vcc"] P7["7
DISCH"] P2["2
TRIG"] P6["6
THRES"] P3["3
OUT"] P5["5
CONT"] P1["1
GND"] end RA["RA"] C1["C1"] C2["C2"] GND["GND"] end VCC --> P4 VCC --> P8 VCC --> RA RA --> P7 P7 --> P6 P6 --> C1 C1 --> GND TRIG_IN["Trigger
Pulse Train"] --> P2 MOD["Modulation
Signal"] --> P5 P5 --> C2 C2 --> GND P3 --> OUTPUT["PWM
Output"] P1 --> GND style VCC fill:#f00,color:#fff style GND fill:#000,color:#fff style TRIG_IN fill:#f96 style MOD fill:#ff6 style OUTPUT fill:#6f6 ``` #### Figure 10. Waveforms of Pulse Width Modulation ``` Control ╭──────╮ ╭──────╮ ╭──────╮ (Pin 5) │ │ │ │ │ │ ───╯ ╰──────╯ ╰──────╯ ╰─── |← Modulation Signal (e.g., Sine) →| Trigger ─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ ┌─┐ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ └─┘ Output ─┐ ┌─┐ ┌───┐ ┌─┐ ┌─┐ ┌───┐ ┌─ (PWM) └──┘ └───┘ └───┘ └──┘ └───┘ └───┘ |←w1→|←w2─→|←w3──→| Pulse width varies with control voltage: - Higher control voltage → Longer pulse width - Lower control voltage → Shorter pulse width RA = 3.9kΩ, RB = 1kΩ, RL = 1kΩ, C1 = 0.01μF, Vcc = 5V ``` ### 5. Pulse Position Modulation If the modulating signal is applied to the control terminal while the timer is connected for the astable operation as in Figure 11, the timer becomes a pulse position modulator. In the pulse position modulator, the reference of the timer's internal comparators is modulated which in turn modulates the timer output according to the modulation signal applied to the control terminal. Figure 12 illustrates a sine wave for modulation signal and the resulting output pulse position modulation : however, any wave shape could be used. #### Figure 11. Circuit for Pulse Position Modulation ```mermaid flowchart LR subgraph CIRCUIT["PPM Configuration"] VCC["+Vcc"] subgraph TIMER["555 Timer"] P4["4
RESET"] P8["8
Vcc"] P7["7
DISCH"] P2["2
TRIG"] P6["6
THRES"] P3["3
OUT"] P5["5
CONT"] P1["1
GND"] end RA["RA"] RB["RB"] C1["C1"] GND["GND"] end VCC --> P4 VCC --> P8 VCC --> RA RA --> P7 P7 --> RB RB --> P6 RB --> P2 P6 --> C1 C1 --> GND MOD["Modulation
Signal"] --> P5 P3 --> OUTPUT["PPM
Output"] P1 --> GND style VCC fill:#f00,color:#fff style GND fill:#000,color:#fff style MOD fill:#ff6 style OUTPUT fill:#6f6 ``` #### Figure 12. Waveforms of Pulse Position Modulation ``` Control ╭────────────╮ ╭────────────╮ (Pin 5) │ │ │ │ ───╯ ╰──────────╯ ╰─── Modulation Signal (Sine Wave) Threshold /\ /\ /\ /\ /\ (Pin 6) ────/ \──/ \────/ \────/ \──/ \──── Output ─┐ ┌─┐ ┌──┐ ┌────┐ ┌──┐ ┌─┐ ┌─ (PPM) └─┘ └──┘ └────┘ └────┘ └──┘ └─┘ |←t1→|←t2─→|←─t3──→|←t4─→|←t5→| Pulse spacing varies with control voltage: - Higher control voltage → Longer period - Lower control voltage → Shorter period RA = 1kΩ, RB = 1kΩ, C1 = 1nF, Vcc = 5V ``` ### 6. Linear Ramp When the pull-up resistor RA in the monostable circuit shown in Figure 1 is replaced with constant current source, the VC1 increases linearly, generating a linear ramp. Figure 13 shows the linear ramp generating circuit and Figure 14 illustrates the generated linear ramp waveforms. #### Figure 13. Circuit for Linear Ramp ```mermaid flowchart TB subgraph CIRCUIT["Linear Ramp Generator"] VCC["+Vcc"] subgraph CURRENT_SOURCE["Constant Current Source"] RE["RE"] Q1["Q1
PNP"] R1["R1"] R2["R2"] end subgraph TIMER["555 Timer"] P4["4
RESET"] P8["8
Vcc"] P7["7
DISCH"] P2["2
TRIG"] P6["6
THRES"] P3["3
OUT"] P5["5
CONT"] P1["1
GND"] end C1["C1"] C2["C2"] GND["GND"] end VCC --> P4 VCC --> P8 VCC --> RE VCC --> R1 RE --> Q1 R1 --> Q1 Q1 --> R2 R2 --> GND Q1 -->|Ic| P7 P7 --> P6 P6 --> C1 C1 --> GND TRIG_IN["Trigger"] --> P2 P3 --> OUTPUT["Output"] P5 --> C2 C2 --> GND P1 --> GND style VCC fill:#f00,color:#fff style GND fill:#000,color:#fff style Q1 fill:#fcf,color:#000 style OUTPUT fill:#6f6 ``` #### Figure 14. Waveforms of Linear Ramp ``` Trigger ─────┐ ┌─────────────────────────── (Pin 2) └─────┘ ↓ Trigger pulse Output ─────────┐ ┌─────────────── (Pin 3) └──────────────┘ |←──── td ────→| Threshold ╱ Linear ramp (not exponential) (Pin 6) ─────╱ 0V ↗ Vcc/3 2Vcc/3 Linear ramp: Vc1 = (Ic/C1) × t Slope S = Ic/C1 R1 = 47kΩ, R2 = 100kΩ, RE = 2.7kΩ, RL = 1kΩ, C1 = 0.01μF, Vcc = 5V ``` In Figure 13, current source is created by PNP transistor Q1 and resistor R1, R2, and RE. #### Equation 6: Current Source Calculation $$I_C = \frac{V_{CC} - V_E}{R_E} \quad (12)$$ Here, VE is: $$V_E = V_{BE} + \frac{R_2}{R_1 + R_2} V_{CC} \quad (13)$$ For example, if Vcc=15V, RE=20kΩ, R1=5kW, R2=10kΩ, and VBE=0.7V, VE=0.7V+10V=10.7V Ic=(15-10.7)/20k=0.215mA When the trigger starts in a timer configured as shown in Figure 13, the current flowing through capacitor C1 becomes a constant current generated by PNP transistor and resistors. Hence, the VC is a linear ramp function as shown in Figure 14. The gradient S of the linear ramp function is defined as follows: #### Equation 7: Ramp Slope $$S = \frac{V_{P-P}}{T} \quad (14)$$ Here the Vp-p is the peak-to-peak voltage. If the electric charge amount accumulated in the capacitor is divided by the capacitance, the VC comes out as follows: ``` V = Q/C (15) ``` The above equation divided on both sides by T gives us #### Equation 8: Simplified Ramp Slope $$\frac{V}{T} = \frac{Q/T}{C} \quad (16)$$ and may be simplified into the following equation. ``` S = I/C (17) ``` In other words, the gradient of the linear ramp function appearing across the capacitor can be obtained by using the constant current flowing through the capacitor. If the constant current flow through the capacitor is 0.215mA and the capacitance is 0.02μF, the gradient of the ramp function at both ends of the capacitor is S = 0.215m/0.022μ = 9.77V/ms. # Mechanical Dimensions ## Package ### 8-DIP (Dual In-line Package) ``` ┌─────────────────────────────────────┐ │ ● │ │ #1 #8 │ │ ┌──┐ ┌──┐ │ │ │ │ │ │ │ │ └──┘ └──┘ │ │ #2 #7 │ │ ┌──┐ 555 TIMER ┌──┐ │ │ │ │ │ │ │ │ └──┘ └──┘ │ │ #3 #6 │ │ ┌──┐ ┌──┐ │ │ │ │ │ │ │ │ └──┘ └──┘ │ │ #4 #5 │ │ ┌──┐ ┌──┐ │ │ │ │ │ │ │ │ └──┘ └──┘ │ └─────────────────────────────────────┘ ``` **8-DIP Dimensions (in millimeters):** | Parameter | Min | Nom | Max | |:---|:---:|:---:|:---:| | Package Length | - | 9.60 | - | | Package Width | 6.20 | 6.40 | 6.60 | | Package Height | - | 5.08 | - | | Lead Pitch | - | 2.54 | - | | Lead Width | 0.36 | 0.46 | 0.56 | | Lead Thickness | - | 0.33 | - | | Lead Length | 2.92 | 3.30 | 3.68 | | Standoff | 0.51 | - | - | ``` 6.40 ± 0.20 ┌────────────────┐ │ │ ┌────┤ ├────┐ │ │ │ │ 9.60 │ │ │ │ MAX │ │ │ │ └────┤ ├────┘ │ │ └────────────────┘ ↕ 2.54 (pin pitch) Side View: ┌────────────────┐ 5.08 │ │ MAX └──┬──┬──┬──┬──┬─┘ │ │ │ │ │ 3.30 ± 0.30 │ │ │ │ │ (lead length) ═══╧══╧══╧══╧══╧═══ ↕ 0.33 MIN ``` ### 8-SOP (Small Outline Package) ``` ┌───────────────────────────────┐ │ ● │ │ #1 #8 │ │ ─┐ ┌─ │ │ │ │ │ ├───┴───────────────────────┴───┤ │ 555 TIMER │ ├───┬───────────────────────┬───┤ │ │ │ │ │ ─┘ └─ │ │ #4 #5 │ └───────────────────────────────┘ ``` **8-SOP Dimensions (in millimeters):** | Parameter | Min | Nom | Max | |:---|:---:|:---:|:---:| | Package Length | 4.72 | 4.92 | 5.12 | | Package Width | 5.70 | 6.00 | 6.30 | | Package Height | - | 1.55 | 1.75 | | Lead Pitch | - | 1.27 | - | | Lead Width | 0.31 | 0.41 | 0.51 | | Lead Length (toe) | 0.40 | 0.80 | 1.27 | | Standoff | 0.05 | 0.15 | 0.25 | | Overall Width (with leads) | - | 6.00 | - | ``` 6.00 ± 0.30 ┌────────────────┐ ─┐ │ │ ┌─ │ │ │ │ 4.92 ± 0.20 ─┘ │ │ └─ └────────────────┘ ↕ 1.27 (pin pitch) Side View: 1.55 ± 0.20 ┌────────────────┐ MAX │ │ └──┬──┬──┬──┬──┬─┘ └──┴──┴──┴──┴── 0.10~0.25 standoff ``` ## Pin Assignment Summary | Pin | Symbol | 8-DIP | 8-SOP | Description | |:---:|:---:|:---:|:---:|:---| | 1 | GND | ● | ● | Ground (0V) | | 2 | TRIG | ● | ● | Trigger input | | 3 | OUT | ● | ● | Output | | 4 | RESET | ● | ● | Reset (active low) | | 5 | CONT | ● | ● | Control voltage | | 6 | THRES | ● | ● | Threshold input | | 7 | DISCH | ● | ● | Discharge | | 8 | Vcc | ● | ● | Supply voltage |