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Natural Frequency Calculator
Calculate resonant frequency of mass-spring systems
Calculation Parameters
Based on ISO 2041:2018 and vibration theory
Calculation Results
Natural Frequency (fn):
—
—
Natural Angular Frequency (ωn):
—
—
Natural Period (T):
—
—
Static Deflection:
—
—
Damped Natural Frequency (fd):
—
—
Frequency Range Assessment:
< 1 Hz: Very low frequency – seismic isolation
1-10 Hz: Low frequency – building vibration range
10-100 Hz: Medium frequency – machine vibration
> 100 Hz: High frequency – precision equipment
How the Calculator Works
Undamped Natural Frequency
For a simple mass-spring system:
fn = (1/2π) × √(k/m)
where:
- fn — natural frequency (Hz)
- k — spring stiffness (N/m)
- m — mass (kg)
Damped Natural Frequency
When damping is present:
fd = fn × √(1 – ζ²)
where ζ is the damping ratio (dimensionless)
Static Deflection Method
Natural frequency from static deflection:
fn = (1/2π) × √(g/δst) ≈ 15.76/√δst
where δst is static deflection in mm
Torsional Systems
For rotational vibration:
fn = (1/2π) × √(kt/J)
where kt is torsional stiffness and J is moment of inertia
Two-Mass Systems
Systems with two masses have two natural frequencies:
- First mode: masses move together
- Second mode: masses move opposite
Important Considerations
- Avoid operating near natural frequency (resonance)
- Stay below 0.7×fn or above 1.4×fn for isolation
- Added mass lowers natural frequency
- Stiffer springs increase natural frequency
- Damping reduces amplitude but not natural frequency significantly
Applications
- Vibration Isolation: Design for fn < forcing frequency/√2
- Seismic Protection: Very low fn (0.5-2 Hz)
- Machine Mounts: Typically 5-15 Hz
- Precision Equipment: High fn to avoid building vibrations
📘 Complete Guide: Natural Frequency Calculator
🎯 What This Calculator Does
Calculates natural frequency of mass-spring systems. Critical for preventing resonance and designing vibration isolation.
Formula: fn = (1/2π) × √(k/m)
💼 Key Applications
- Vibration Isolation: Compressor 1200 kg, 1500 RPM (25 Hz). For isolation: fn < 25/3 ≈ 8 Hz. Required spring stiffness: k < 30000 N/m.
- Resonance Prevention: Turbine on foundation, fn = 4.2 Hz. Rotation: 3000 RPM = 50 Hz. Ratio 50/4.2 = 12 → No resonance danger.
- Dynamic Absorber: Shaft vibrates at 180 Hz. Install absorber with fn = 180 Hz to suppress vibration.
Isolation Principle:
For effective isolation from vibration at frequency f:
- Good isolation: fn < f/√2 (transmissibility TR < 1)
- Effective: fn < f/3 (TR < 0.1, 90% reduction)
- Excellent: fn < f/5 (TR < 0.04, 96% reduction)
📖 Quick Reference
- Resonance: Amplification occurs when external frequency = natural frequency (can increase 10-50×)
- Static Deflection: δst = mg/k. Relation: fn ≈ 5/√δst (δst in mm)
- Damping (ζ): Steel springs: 0.01-0.03, Rubber: 0.05-0.15, Critical: 1.0
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