CSBLA455KEC8-B0 Murata, CSBLA455KEC8-B0 Datasheet - Page 17

CSBLA455KEC8-B0

Manufacturer Part Number

CSBLA455KEC8-B0

Description

Resonators 455kHz 0.5%

Manufacturer

Murata

Series

CSBLAr

Datasheets

1.CSBLA400KECE-B0.pdf (42 pages)

2.CSBLA455KEC8-B0.pdf (1 pages)

3.CSACS8.00MT-TC.pdf (21 pages)

Specifications of CSBLA455KEC8-B0

Tolerance

0.5 %

Termination Style

Through Hole

Operating Temperature Range

- 20 C to + 80 C

Dimensions

7 mm W x 9 mm L x 3.5 mm H

Frequency Stability

0.3 %

Frequency

455 KHz

Lead Free Status / RoHS Status

Lead free / RoHS Compliant

Available stocks

Company

Part Number

Manufacturer

Quantity

Price

Company:

Bonase Electronics (HK) Co., Limited

Part Number:

CSBLA455KEC8-B0

Manufacturer:

MURATA

Quantity:

1 000

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!Note

becomes like Fig. 4. Z

(Note 3)

Fig. 3 shows the equivalent circuit of an emitter

grounding type transistor circuit. In the figure, Ri

stands for input impedance, R

impedance and

rate.

When the oscillation circuit in Fig. 2-6 is expressed

by using the equivalent circuit in Fig. 3, it

the table for each Hartley type and Colpitts type

circuit.

The following 3 formulas are obtained based on

Fig. 4.

Please read rating and !CAUTION (for storage, operating, rating, soldering, mounting and handling) in this PDF catalog to prevent smoking and/or burning, etc.

This catalog has only typical specifications. Therefore, you are requested to approve our product specifications or to transact the approval sheet for product specificaions before ordering.

Fig. 4 4 Hartley/Colpitts Type LC Oscillation Circuits

Notes

+Ri) i

+(R

–(Z

–Z

Hartley Type

+Z+Z

stands for current amplification

1 / j C

) i

j L

–Z

0 1

Fig. 3 3

) i

, Z

and Z are as shown in

0 1

stands for output

Colpitts Type

···················(1)

···················(2)

···················(3)

1 / j C

j L

As i

oscillation, the following conditional formula can be

performed by solving the formulas of (1), (2) and (3)

on the current.

Then, as Z

the following conditional formula is obtained by

dividing the formula (4) into the real number part

and the imaginary number part.

Formula (5) represents the phase condition and

formula (6) represents the power condition.

Oscillation frequency can be obtained by applying

the elements shown in the aforementioned table to

In either circuit, the term in brackets will be 1 as

long as Ri and R

oscillation frequency can be obtained by the

following formula.

(Hartley Type)

(Colpitts Type)

(Hartley Type)

(Colpitts Type)

osc = (2 fosc.)

(Imaginary number part)

(Real number part)

and Z solving it for angular frequency .

0, i

(Z+Z

, Z

=(Z

Principles of CERALOCK

Z+(Z

0, i

and Z are all imaginary numbers,

fosc. =

)Ri=0

+Ri)Z

+Z+Z

fosc. =

is large enough. Therefore

0 are required for continuous

(Z+Z

L C

+Z)RiR

)Ri}(Z

–{Z

) C{1+

·C

L · C

+Z)+

· {1+

)

) C

·C

+ L

···················(4)

···················(6)

···················(7)

···················(8)

· L

) CR R

P17E14.pdf 04.8.24

·············(5)

·······(9)

·····(10)

) R R

}

CSBLA455KEC8-B0 Murata, CSBLA455KEC8-B0 Datasheet - Page 17

CSBLA455KEC8-B0

Specifications of CSBLA455KEC8-B0

Available stocks

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